Apparatus and method for improved modulation and coding schemes for broadband satellite communications systems

ABSTRACT

Modulation and coding schemes are provided for improved performance of wireless communications systems to support services and applications for terminals with operational requirements at relatively low E s /N 0  ratios and terminals at relatively high E s /N 0  ratios. The new modulation and coding schemes provide new BCH codes, low density parity check (LDPC) codes and interleaving methods. The modulation and coding schemes also provide new modulation signal constellations.

BACKGROUND

Over recent decades, developments in data communications technologies have continued to provide enhanced multimedia services (e.g., voice, data, video, etc.) to end-users. Such communications technologies encompass various delivery platforms, including terrestrial wire-line, fiber and wireless communications and networking technologies, and satellite communications and networking technologies. Further, in recent years, the proliferation of mobile communications has spurred an exponential growth in the provision of such enhanced multimedia services over mobile communications networks (both terrestrial and satellite based). As part of the continued evolution of such communications platforms and supporting technologies, the Digital Video Broadcasting (DVB) organization was formed (as an industry-led, global consortium of broadcasters, manufacturers, network operators, software developers, regulatory bodies and others) to advance the design of open interoperable standards for the global delivery of digital media and broadcast services.

As part of the standardization process for digital media and broadcast services, the DVB organization managed the adoption and publication of the DVB-S2 standard via recognized standards setting organizations (e.g., ETSI and TIA). DVB-S2 is a digital satellite transmission system standard covering framing structure, channel coding and modulation systems, designed for broadcast services (for standard and high definition television), interactive services (e.g., Internet access for consumer applications), and other broadband satellite applications. DVB-S2 represents a flexible standard, covering a variety of data and multimedia services delivered over satellite communications systems. The DVB-S2 standard covers various technological features, such as a flexible input stream adapter (suitable for operation with single and multiple input streams of various formats), a robust forward error correction coding (FEC) system based on low-density parity check (LDPC) codes concatenated with Bose Chaudhuri Hocquenghem (BCH) codes, a wide range of code rates (from 1/4 up to 9/10), four signal constellations (ranging in spectrum efficiency from 2 bit/s/Hz to 5 bit/s/Hz), and adaptive coding and modulation (ACM) functionality (optimizing channel coding and modulation on a frame-by-frame basis).

Since its inception, the DVB-S2 standard has been adopted globally as a predominant standard for broadcast, interactive and other broadband applications and services over satellite communications networks. Currently, there are applications and services for terminals, particularly in the field of mobile communications, that require operation at lower signal-to-noise ratios (E_(s)/N₀), down to approximately −9 dB to −10 dB. The current modulation and coding schemes (e.g., the modulation and coding schemes of the DVB-S2 standard), however, support operation down to E_(s)/N₀ ratios of only about −3 dB, and thus are unable to support the operational requirements for such current mobile and other low signal-to-noise ratio (SNR) terminals (e.g., below −3 dB). Further, such current modulation and coding schemes support operation at the upper end to E_(s)/N₀ ratios of about 15.5 dB, and thus are unable to support the operational requirements for higher end terminals (e.g., above 15.5 dB). Additionally, the modulation and coding schemes of the current DVB-S2 standard (E_(s)/N₀ ratios within the range of approximately −3 dB to 15.5 dB) lack sufficient granularity to meet the requirements of terminals in the growing field of broadcast, interactive and other broadband applications and services over satellite communications networks.

What is needed, therefore, are systems and methods for providing modulation and coding schemes that support current and future communications services and applications for terminals with operational requirements at relatively low SNR and terminals with operational requirements at relatively high SNR, and to provide modulation and coding schemes that offer finer granularity (among existing modulation and coding schemes) within an intermediate operational range.

SOME EXEMPLARY EMBODIMENTS

The present invention advantageously addresses the foregoing requirements and needs, as well as others, by providing a system and methods for providing modulation and coding schemes that support current and future communications services and applications for terminals with operational requirements at relatively low E_(s)/N₀ ratios (e.g., within the operational range of approximately −3 dB to −10 dB) and terminals with operational requirements at relatively high E_(s)/N₀ ratios (e.g., within the operational range of approximately 15.5 dB to 24 dB), and to provide modulation and coding schemes that offer finer granularity within an intermediate operational range of E_(s)/N₀ ratios (e.g., approximately −3 dB to 15.5 dB).

According to an exemplary embodiment, a method comprises encoding, by a processor of a device, a source data sequence of information bits based on a predetermined structured parity check matrix of a Low Density Parity Check (LDPC) code, wherein the encoding is performed based on frames of the source data sequence, each frame being of a length of k_(ldpc) information bits (i₀, i₁, . . . , i_(k) _(ldpc) ⁻¹), and the output of the encoding comprises coded LDPC frames each being n_(ldpc) coded bits in length. The structured parity check matrix is represented by tabular information (a code table) of a format wherein each row represents occurrences of one values within a respective column of the parity check matrix, and the columns of the parity check matrix are derived according to a predetermined operation based on the respective rows of the tabular information, and wherein the code table comprises one of a selection of new LDPC code designs (each represented by a respective code table). According to the method, the encoding wherein the encoding comprises generating n_(ldpc)-k_(ldpc) parity bits (p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹) for each frame of the source data sequence, wherein the generation of the parity bits comprises: initializing parity bit accumulators for p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹ to zero; accumulating information bit i₀ at parity bit accumulator addresses specified in the first row of the table; for the next group of m−1 information bits, i_(y) (y=1, 2, . . . , m−1), accumulating each information bit at parity bit accumulator addresses {x+(y mod m)*q} mod(n_(ldpc)−k_(ldpc)), wherein x denotes an address of a parity bit accumulator corresponding to the information bit i₀, and q is a code-rate dependent constant (q=(n_(ldpc)−k)/m), and wherein m is a code-dependent constant and k=R*n (where R is the code rate); accumulating i_(m) at parity bit accumulator addresses specified in the second row of the table, and, in a similar manner as for the group of m−1 information bits (above), accumulating each information bit of the next group of m−1 information bits i_(z), z=(m+1, m+2, . . . , 2m) at {x+(z mod m)*q} mod (n_(ldpc)−k_(ldpc)), wherein x denotes the address of the parity bit accumulator corresponding to the information bit i_(m) (the entries of the second row of the table); in a similar manner, for each subsequent group of m information bits, accumulating the information bits at parity bit addresses based on a next row of the table; and after all of the information bits of the frame are accumulated, performing operations according to p_(i)=p_(i)⊕p_(i−1), wherein for i=1, 2, . . . , (n_(ldpc)−k_(ldpc)−1), each p_(i) resulting from the operation for a given i is equal to the parity bit p_(i).

According to a further exemplary embodiment, the method further comprises interleaving each coded LDPC frame using a block interleaver, wherein the coded bits are written into an interleaver array on a column-by-column basis and read out on a row-by-row basis, and the output of the interleaving comprises coded FEC frames. The interleaver array comprises a number of rows and a number of columns, and the coded bits are read out of each row in a predetermined order, wherein the number of columns in the interleaver array is based on a selected modulation scheme, and the coded bits are read out of each row of the interleaver array in a predetermined order based on the selected modulation scheme and a selected code rate.

According to yet a further exemplary embodiment, the method further comprises modulating the coded FEC frames according to a selected modulation scheme, wherein the selected modulation scheme comprises one of the following modulation types: BPSK (Binary Phase Shift Keying), π/2 BPSK, OQPSK (Offset Quadrature Phase Shift Keying), QPSK (Quadrature Phase Shift Keying), 8-PSK (Phase Shift Keying), 16-APSK (Amplitude Phase Shift Keying), 32-APSK, 64-APSK and 256-APSK, wherein, in the case of BPSK, π/2 BPSK or QPSK, the coded FEC frames are not interleaved. Additionally, according to a further exemplary embodiment, the selected modulation scheme is a 256-APSK modulation based on a signal constellation of a 32+32+64+64+64 ring format, having a novel design for the bit labeling and [x, y] bit coordinate positions.

Still other aspects, features, and advantages of the present invention are readily apparent from the following detailed description, simply by illustrating a number of particular embodiments and implementations, including the best mode contemplated for carrying out the present invention. The present invention is also capable of other and different embodiments, and its several details can be modified in various obvious respects, all without departing from the spirit and scope of the present invention. Accordingly, the drawing and description are to be regarded as illustrative in nature, and not as restrictive.

BRIEF DESCRIPTION OF THE DRAWINGS

The present invention is illustrated by way of example, and not by way of limitation, in the figures of the accompanying drawings and in which like reference numerals refer to similar elements and in which:

FIG. 1A illustrates a communications system capable of employing modulation and coding protocols, in accordance with exemplary embodiments of the present invention;

FIG. 1B illustrates a satellite communications system capable of employing modulation and coding protocols, in accordance with exemplary embodiments of the present invention;

FIG. 2A illustrates a block diagram of an exemplary transmitter configured to operate in the systems of FIGS. 1A and 1B, in accordance with exemplary embodiments of the present invention;

FIG. 2B illustrates a block diagram of an exemplary receiver configured to operate in the systems of FIGS. 1A and 1B, in accordance with exemplary embodiments of the present invention;

FIG. 3A illustrates the bit interleaving scheme for the 8PSK modulation formats (for all rates except rate 3/5) of the DVB-S2 standard for the normal FEC Frame length;

FIG. 3B illustrates the bit interleaving scheme for the 8PSK modulation formats (for rate 3/5 only) of the DVB-S2 standard for the normal FEC Frame length;

FIG. 4A illustrates a prior art 32APSK (4+12+16) signal constellation;

FIG. 4B illustrates a prior art 64APSK (8+16+20+20) signal constellation;

FIG. 5 illustrates simulated performance curves for various FEC codes with QPSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 6 illustrates simulated performance curves for various FEC codes with 8PSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 7 illustrates simulated performance curves for the various FEC codes with 16APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 8 illustrates simulated performance curves for the various FEC codes with 32APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 9 illustrates simulated performance curves for the various FEC codes with 64APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 10 illustrates simulated performance curves for the various FEC codes with 256APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention;

FIG. 11 illustrates a flow chart of an exemplary process for encoding and modulating a source data sequence of information bits, in accordance with exemplary embodiments of the present invention;

FIG. 12 illustrates a flow chart of an exemplary process for demodulating and decoding a received data signal transmission to replicate a source data sequence of information bits that was encoded and modulated, in accordance with exemplary embodiments of the present invention;

FIG. 13 illustrates a block diagram of a chip set that can be utilized in implementing communications system protocols, according to exemplary embodiments of the present invention.

DETAILED DESCRIPTION

A system and methods for communications system protocols to support communications services and applications over relatively low signal-to-noise ratio (E_(s)/N₀) links, is described. In the following description, for the purposes of explanation, numerous specific details are set forth in order to provide a thorough understanding of the invention. It is apparent, however, that the invention may be practiced without these specific details or with an equivalent arrangement. In other instances, well known structures and devices are shown in block diagram form in order to avoid unnecessarily obscuring the invention.

FIG. 1A illustrates a communications system capable of employing modulation and coding protocols, in accordance with exemplary embodiments of the present invention. With reference to FIG. 1A, a broadband communications system 110 includes one or more transmitters 112 (of which one is shown) that generate signal waveforms for transmission to one or more receivers 116 (of which one is shown). The signal waveforms are transmitted across a communications channel 114, which (for example) may comprise a channel of a terrestrial, wireless terrestrial or satellite communications system. In this discrete communications system 110, the transmitter 112 has a signal source that produces a discrete set of data signals, where each of the data signals is transmitted over a corresponding signal waveform. The discrete set of data signals may first be encoded (e.g., via a forward error correction (FEC) code) to combat noise and other issues associated with the channel 114. Once encoded, the encoded signals may then be modulated onto a carrier for transmission over the channel 114. The signal waveforms are attenuated, or otherwise altered, by communications channel 114.

FEC is required in terrestrial and satellite systems to provide high quality communication over a radio frequency (RF) propagation channel, which induces signal waveform and spectrum distortions, including signal attenuation (freespace propagation loss), multi-path induced fading and adjacent channel interference. These impairments drive the design of the radio transmission and receiver equipment; exemplary design objectives include selecting modulation formats, error control schemes, demodulation and decoding techniques and hardware components that together provide an efficient balance between system performance and implementation complexity. Differences in propagation channel characteristics, such as between terrestrial and satellite communication channels, naturally result in significantly different system designs. Likewise, existing communications systems continue to evolve in order to satisfy increased system requirements for new higher rate or higher fidelity communication services.

FIG. 1B illustrates a satellite communications system capable of employing modulation and coding protocols, in accordance with exemplary embodiments of the present invention. With reference to FIG. 1B, satellite communications system 120 includes a satellite 121 that supports communication among multiple satellite terminals (STs) 123 a-123 n, user terminals (UTs) 127 a-127 n, and a hub 127. The HUB 127 may assume the role of a Network Operations Center (NOC), which controls the access of the STs 123 a-123 n and UTs 127 a-127 n to the system 120, and also provides element management functions and control of the address resolution and resource management functionality. The Satellite communications system 120 may operate as a traditional bent-pipe system, where the satellite essentially operates as a repeater. Alternatively, the system 120 may employ a switching or processing satellite supporting mesh communications (point-to-point communications directly between a pair of the STs 123 a-123 n and UTs 127 a-127 n).

In a traditional bent-pipe system of an exemplary embodiment, for example, the satellite operates as a repeater or bent pipe, and communications between the STs 123 a-123 n and UTs 127 a-127 n are transmitted over a double-hop path. For example, in a communication from ST 123 a to ST 123 n, over the first hop, the communication is transmitted, via the satellite, from the ST 123 a to the HUB 127. The HUB 127 decodes the communication and determines the destination as ST 123 n. The HUB 127 then appropriately addresses and repackages the communication, encodes and modulates it, and transmits the communication over the second hop, via the satellite, to the destination ST 123 n. Accordingly, the satellite of such a system acts as a bent pipe or repeater, transmitting communications between the HUB 127 and the STs/UTs.

In an alternate embodiment, with a communications system 120 that employs a processing satellite (e.g., including a packet switch operating, for example, at a data link layer), the system may support direct unicast (point-to-point) communications and multicast communications among the STs 123 a-123 n and UTs 127 a-127 n. In the case of a processing satellite, the satellite 121 decodes the received signal and determines the destination ST(s)/UT(s) (as the hub 127 would in a bent-pipe system). The satellite 121 then addresses the data accordingly, encodes and modulates it, and transmits the modulated signal, over the channel 114, to the destination ST(s)/UT(s). Further, the STs 123 a-123 n may each provide connectivity to one or more respective hosts (e.g., hosts 125 a-125 n, respectively).

Further, based on recent trends in the advancement of current applications and services and in the development of new applications and services, it is envisioned that systems employing a multiplexing of data signals on the same channel 114 (e.g., time multiplexed), where (on a frame-by-frame basis) such data signals may be destined for different receive terminals of different capabilities (e.g., any combination of STs 125 a-125 n and UTs 127 a-127 n. For example, data signals destined for high S/N terminals (e.g., any of the STs 125 a-125 n) may be multiplexed with data signals destined for lower S/N terminals (e.g., any of the UTs 127 a-127 n), on the same channel 114 (on a frame-by-frame basis).

FIG. 2A illustrates a block diagram of an exemplary transmitter configured to operate in the systems of FIGS. 1A and 1B, in accordance with exemplary embodiments of the present invention. With reference to FIG. 2A, the transmitter 210 is equipped with a data encapsulation module 211 that accepts the original application layer source data and performs the upper layer encapsulation to from the baseband frames. The encoder (e.g., an FEC encoder) 213 receives the baseband frames from the data encapsulation module 211, and outputs a coded stream of higher redundancy suitable for error correction processing at the receiver (shown in FIG. 6). The encoded signal is fed to the modulator 215, which maps the encoded messages to signal waveforms, based in part on modulation signal constellations. For example, the data encapsulation module 211 performs the upper layer encapsulation to generate the baseband frames based on the source data bits, and then the encoder 213 and modulator 215 collectively perform the modulation and coding of the baseband frames and the generation of the physical layer frames, in accordance with the exemplary embodiments of the present invention. The physical layer frames are then transmitted (as signal waveforms), via the transmit antenna 217, over the communication channel 114 to the satellite 121.

FIG. 2B illustrates a block diagram of an exemplary receiver configured to operate in the systems of FIGS. 1A and 1B, in accordance with exemplary embodiments of the present invention. With reference to FIG. 2B, the receiver 220 comprises receive antenna 229, sync module 227 demodulator 225, decoder 223 and de-encapsulation module 221. The receive antenna 229 receives the signal waveform transmitted over the channel 114 from the satellite 121. The sync module 227 detects the unique word, performs synchronization and determines the modcod and other PLS signaling of the PL Header. The demodulator 225 demodulates the received signal waveforms, based in part on the signal constellation employed for the modulation, to obtain the encoded signals. The decoder 223 then decodes the demodulated bit sequence to generate the encapsulated message data, and the de-encapsulation module 221 de-encapsulates the message data to regenerate the original source data.

As mentioned above, as one exemplary embodiment for broadcast and broadband communications services over satellite networks, the DVB-S2 standard has been adopted globally as a predominant standard for broadcast, interactive and other broadband services and applications. The framing structure, channel coding and modulation systems of the DVB-S2 standard are described in the European Telecommunications Standards Institute (ETSI) publication, ETSI EN 302 307 V1.3.1, which is incorporated herein by reference in its entirety. DVB-S2 represents a flexible standard, covering a variety of data and multimedia services delivered over satellite communications systems. Generic Stream Encapsulation (GSE) protocols may be employed to provide a data link layer protocol that facilitates the transmission of user or application data from packet oriented protocols (e.g., Internet protocol or IP) on top of a unidirectional physical layer protocol (e.g., DVB-S2). According to the GSE protocol, application data in the form of packet data units (PDUs) are first encapsulated within the baseband frames of the communications network (e.g., DVB-S2 baseband packets in a satellite communications system).

The DVB-S2 standard, for example, was designed to facilitate robust synchronization and signaling at the physical layer, and synchronization and detection of the modulation and coding parameters by a receiver before demodulation and FEC decoding. At the physical layer, baseband frames are encoded to form an output stream of FEC Frames. For example, the baseband frames are encoded by the FEC encoder 213, which comprises a t-error BCH outer coding via the BCH encoder 213 a, an LDPC inner coding via the LDPC encoder 213 b, and bit interleaving via the bit interleaver 213 c. The interleaver 213 c reorders the encoded sequence of symbols or bits from the LDPC encoder 213 b in a predetermined manner. More specifically, the FEC coding subsystem of DVB-S2 comprises a BCH outer coding, LDPC inner coding and bit interleaving. The input to the FEC subsystem consists of a data stream of baseband frames, where each baseband frame of K_(bch) bits is processed by the coding system to produce an FEC Frame of n_(ldpc) bits, where n_(ldpc)=64,800 for a normal FEC Frame and n_(ldpc)=16,200 for a short FEC Frame.

Physical Layer framing is then performed, by slicing the XFEC Frames into a number of fixed length slots (of length M=90 symbols each), to generate the physical layer frames, as specified in Section 5.5 of the above-incorporated DVB-S2 publication, ETSI EN 302 307.

For the outer BCH coding, the BCH coding parameters are specified in the following tables:

TABLE 1a Coding Parameters (normal FEC Frame − LDPC Coded Block n_(ldpc) = 64800) LDPC Code BCH Uncoded BCH Coded Block N_(bch) BCH t-Error Rate Block K_(bch) LDPC Uncoded Block k_(ldpc) Correction (bits) 1/4 16008 16200 12 1/3 21408 21600 12 2/5 25728 25920 12 1/2 32208 32400 12 3/5 36688 38880 12 2/3 43040 43200 10 3/4 48408 48600 12 4/5 51648 51840 12 5/6 53840 54000 10 8/9 57472 57600 8  9/10 58192 58320 8

TABLE 1b Coding Parameters (short FEC Frame − LDPC Coded Block n_(ldpc) = 16200) BCH BCH Coded Effective LDPC Uncoded Block N_(bch) LDPC Code Block LDPC Uncoded BCH t-Error Rate Rate K_(bch) Block k_(ldpc) Correction (bits) (k_(ldpc)/16200 1/4 3072 3240 12 1/5 1/3 5232 5400 12 1/3 2/5 6312 6480 12 2/5 1/2 7032 7200 12 4/9 3/5 9552 9720 12 3/5 2/3 10632 10800 12 2/3 3/4 11712 11880 12 11/15 4/5 12432 12600 12 7/9 5/6 13152 13320 12 37/45 8/9 14232 14400 12 8/9  9/10 N/A N/A N/A N/A

The generator polynomial of the BCH encoder is obtained by multiplying the first t polynomials specified in the following tables:

TABLE 2a BCH Polynomials (normal FEC Frame − LDPC Coded Block n_(ldpc) = 64800) g₁(x) 1 + x² + x³ + x⁵ + x¹⁶ g₂(x) 1 + x + x⁴ + x⁵ + x⁶ + x⁸ + x¹⁶ g₃(x) 1 + x² + x³ + x⁴ + x⁵ + x⁷ + x⁸ + x⁹ + x¹⁰ + x¹¹ + x¹⁶ g₄(x) 1 + x² + x⁴ + x⁶ + x⁹ + x¹¹ + x¹² + x¹⁴ + x¹⁶ g₅(x) 1 + x + x² + x³ + x⁵ + x⁸ + x⁹ + x¹⁰ + x¹¹ + x¹² + x¹⁶ g₆(x) 1 + x² + x⁴ + x⁵ + x⁷ + x⁸ + x⁹ + x¹⁰ + x¹² + x¹³ + x¹⁴ + x¹⁵ + x¹⁶ g₇(x) 1 + x² + x⁵ + x⁶ + x⁸ + x⁹ + x¹⁰ + x¹¹ + x¹³ + x¹⁵ + x¹⁶ g₈(x) 1 + x + x² + x⁵ + x⁶ + x⁸ + x⁹ + x¹² + x¹³ + x¹⁴ + x¹⁶ g₉(x) 1 + x⁵ + x⁷ + x⁹ + x¹⁰ + x¹¹ + x¹⁶ g₁₀(x) 1 + x + x² + x⁵ + x⁷ + x⁸ + x¹⁰ + x¹² + x¹³ + x¹⁴ + x¹⁶ g₁₁(x) 1 + x² + x³ + x⁵ + x⁹ + x¹¹ + x¹² + x¹³ + x¹⁶ g₁₂(x) 1 + x + x⁵ + x⁶ + x⁷ + x⁹ + x¹¹ + x¹² + x¹⁶

TABLE 2b BCH Polynomials (short FEC Frame − LDPC Coded Block n_(ldpc) = 16200) g₁(x) 1 + x + x³ + x⁵ + x¹⁴ g₂(x) 1 + x⁶ + x⁸ + x¹¹ + x¹⁴ g₃(x) 1 + x + x² + x⁶ + x⁹ + x¹⁰ + x¹⁴ g₄(x) 1 + x⁴ + x⁷ + x⁸ + x¹⁰ + x¹² + x¹⁴ g₅(x) 1 + x² + x⁴ + x⁶ + x⁸ + x⁹ + x¹¹ + x¹³ + x¹⁴ g₆(x) 1 + x³ + x⁷ + x⁸ + x⁹ + x¹³ + x¹⁴ g₇(x) 1 + x² + x⁵ + x⁶ + x⁷ + x¹⁰ + x¹¹ + x¹³ + x¹⁴ g₈(x) 1 + x⁵ + x⁸ + x⁹ + x¹⁰ + x¹¹ + x¹⁴ g₉(x) 1 + x + x² + x³ + x⁹ + x¹⁰ + x¹⁴ g₁₀(x) 1 + x³ + x⁶ + x⁹ + x¹¹ + x¹² + x¹⁴ g₁₁(x) 1 + x⁴ + x¹¹ + x¹² + x¹⁴ g₁₂(x) 1 + x + x² + x³ + x⁵ + x⁶ + x⁷ + x⁸ + x¹⁰ + x¹³ + x¹⁴

The BCH encoding of information bits m=(m_(k) _(bch) ⁻¹, m_(k) _(bch) ⁻², . . . m₁, m₀) onto a codeword c=(m_(k) _(bch) ⁻¹, m_(k) _(bch) ⁻², . . . m₁, m₀, d_(n) _(bch) _(−k) _(bch) ⁻¹, d_(n) _(bch) _(−k) _(bch) ⁻², . . . d₁, d₀) is achieved as follows: (1) multiply the message polynomial m(x)=(m_(k) _(bch) ⁻¹x^(k) ^(bch) ⁻¹+m_(k) _(bch) ⁻²x^(k) ^(bch) ⁻²+ . . . +m₁x+m₀) by x^(n) ^(bch) ^(−k) ^(bch) ; (2) divide x^(n) ^(bch) ^(−k) ^(bch) m(x) by the generator polynomial g(x), where d(x)=(d_(n) _(bch) _(−k) _(bch) ⁻¹x^(n) ^(bch) ^(−k) ^(bch) ⁻¹+ . . . +d₁x+d₀) is the remainder; and (3) set the codeword polynomial c(x)=x^(n) ^(bch) ^(−k) ^(bch) m+d(x).

Next, for the LDPC inner coding, the LDPC encoder systematically encodes an information block of size k_(ldpc), i=(0, i₀, i₁, . . . , i_(k) _(ldpc) ⁻¹ onto a codeword of size n_(ldpc), c=(i₀, i₁, . . . i_(k) _(ldpc) ⁻¹, p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹). The transmission of the codeword starts in the given order from i₀ and ends with p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹. The LDPC code parameters (k_(ldpc), n_(ldpc)) are specified in the above tables 1a and 1b. For backwards compatible modes, the output of the inner code is processed according to Annex F of the above-incorporated DVB-S2 publication, ETSI EN 302 307.

The task of the LDPC encoder is to determine n_(ldpc)−k_(ldpc) parity bits (p₀, p₁, . . . p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹) for every block of k_(ldpc) information bits (i₀, i₁, . . . , i_(k) _(ldpc) ⁻¹). The procedure is as follows: (1) initialize p₀=p₁= . . . =p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹=0; (2) for the first information bit i₀, accumulate i₀ at the parity bit addresses specified in the first row of the table for the respective code rate and FEC Frame size—The tables are specified in Annexes B and C of the above-incorporated DVB-S2 publication, ETSI EN 302 307. For example, for the rate 2/3 code for n_(ldpc)=64800 (Table B.6 of Annex B), where all additions are in GF(2):

-   p₀=p₀⊕i₀ -   p₂₇₆₇=p₂₇₆₇⊕i₀ -   p₁₀₄₉₁=p₁₀₄₉₁⊕i₀ -   p₂₄₀=p₂₄₀⊕i₀ -   p₁₆₀₄₃=p₁₆₀₄₃⊕i₀ -   p₁₈₆₇₃=p₁₈₆₇₃⊕i₀ -   p₅₀₆=p₅₀₆⊕i₀ -   p₉₂₇₉=p₉₂₇₉⊕i₀ -   p₁₂₈₂₆=p₁₂₈₂₆⊕i₀ -   p₁₀₅₇₉=p₁₀₅₇₉⊕i₀ -   p₈₀₆₅=p₈₀₆₅⊕i₀ -   p₂₀₉₂₈=p₂₀₉₂₈⊕i₀ -   p₈₂₂₆=p₈₂₂₆⊕i₀     (3) for the next 359 information bits i_(m), m=1, 2, . . . , 359,     accumulate i_(m) at parity bit addresses {x+m mod 360*q}     mod(n_(ldpc)−k_(ldpc)), where x denotes the address of the parity     bit accumulator corresponding to the first bit i₀, and q is a code     rate dependent constant (specified in Tables 3a and 3b, below).     Continuing with the example for the rate 2/3 code for     n_(ldpc)=64800, q=60—so, for example, for information bit i₁, the     following operations are performed: -   p₆₀=p₆₀⊕i₁ -   p₂₈₂₇=p₂₈₂₇⊕i₁ -   p₁₀₅₅₁=p₁₀₅₅₁⊕i₁ -   p₃₀₀=p₃₀₀⊕i₁ -   p₁₆₁₀₃=p₁₆₁₀₃⊕i₁ -   p₁₈₇₃₃=p₁₈₇₃₃⊕i₁ -   p₅₆₆=p₅₆₆⊕i₁ -   p₉₃₃₉=p₉₃₃₉⊕i₁ -   p₁₂₈₈₆=p₁₂₈₈₆⊕i₁ -   p₁₀₆₃₉=p₁₀₆₃₉⊕i₁ -   p₈₁₂₅=p₈₁₂₅⊕i₁ -   p₂₀₉₈₈=p₂₀₉₈₈⊕i₁ -   p₈₂₈₆=p₈₂₈₆⊕i₁     (4) for the 361^(st) information bit i₃₆₀, accumulate i₃₆₀ at the     parity bit addresses specified in the second row of the appropriate     table (in Annexes B and C of ETSI EN 302 307) table for the     respective code rate and FEC Frame size. Then, in a similar manner     the addresses of the parity bit accumulators for the following 359     information bits i_(m), m=361, 362, . . . , 719 are obtained using     the formula {x+m mod 360*q} mod (n_(ldpc)−k_(ldpc)), where x denotes     the address of the parity bit accumulator corresponding to the first     bit i₃₆₀, (the entries of the second row of the respective table);     and (5) in a similar manner, for every group of 360 new information     bits, a new row from the respective table is used to find the     addresses of the parity bit accumulators.     Then, once all the information bits are exhausted, the final parity     bits are obtained by sequentially performing the following     operations, starting with i=1, p_(i)=p_(i)⊕p_(i−1), where i=1, 2, .     . . , n_(ldpc)−k_(ldpc)−1, and then the final content of p_(i), i=0,     1, . . . , n_(ldpc)−k_(ldpc)−1 is equal to the parity bit p_(i).

TABLE 3a q Values (normal FEC Frame − LDPC Coded Block n_(ldpc) = 64800) LDPC Code Rate q 1/4 135 1/3 120 2/5 108 1/2 90 3/5 72 2/3 60 3/4 45 4/5 36 5/6 30 8/9 20  9/10 18

TABLE 3b q Values (short FEC Frame − LDPC Coded Block n_(ldpc) = 16200) LDPC Code Rate q 1/4 36 1/3 30 2/5 27 1/2 25 3/5 18 2/3 15 3/4 12 4/5 10 5/6 8 8/9 5

With reference to FIGS. 3A and 3B, for the 8PSK, 16APSK and 32APSK modulation schemes of the DVB-S2 standard, the bit interleaver 213 c comprises a block interleaver that interleaves the output of the LDPC encoder 213 b. Data is serially written into the interleaver column-wise, and serially read out row-wise (the MSB of baseband frame header is read out first, except in the case of the 8PSK rate 3/5 modulation where MSB of the baseband frame header is read out third), as illustrated in FIGS. 3A and 3B, respectively. The configuration of the block interleaver for each modulation format is specified in the following table:

TABLE 4 Block Interleaver Configurations Modulation Rows (n_(ldpc) = 64800) Rows (n_(ldpc) = 16200) Columns 8PSK 21600 5400 3 16APSK 16200 4050 4 32APSK 12960 3240 5

For the DVB-S2 modulation, each FEC Frame (comprising a sequence of 64,800 bits for a normal FEC Frame, or 16,200 bits for a short FEC Frame) is then modulated based on one of various options specified in the standard for modulation of the data payload (e.g., QPSK, 8PSK, 16APSK, or 32APSK). For example, each FEC Frame is serial-to-parallel converted with the following parallelism levels: η_(MOD) 2 for QPSK; η_(MOD) 3 for 8PSK; η_(MOD) 4 for 16APSK; η_(MOD) 5 for 32APSK. Then, each resulting parallel sequence is mapped based on a signal constellation, generating an (I, Q) sequence of variable length depending on the selected modulation efficiency (η_(MOD) bits/Hz). The DVB-S2 signal constellations for the QPSK, 8PSK, 16APSK, and 32 APSK modulation schemes are illustrated in FIGS. 9-12 (respectively) of the above-incorporated DVB-S2 publication, ETSI EN 302 307. The resulting output sequence is referred to as a complex FEC Frame or XFEC Frame, composed of 64,800/η_(MOD)(normal XFEC Frame) modulation symbols, or 16,200/η_(MOD)(short XFEC Frame) modulation symbols. Each modulation symbol thereby comprises a complex vector in the format (I, Q) (I being the in-phase component and Q the quadrature component), or in the equivalent format ρ exp jφ (ρ being the modulus of the vector and φ being its phase).

With respect to other current modulation schemes, copending U.S. patent application Ser. No. 13/327,316, which is incorporated herein in its entirety, provides a 32APSK constellation and a 64APSK constellation. The 32APSK signal constellation is provided with a ring format of 4+12+16 (4 constellation points on the inner-most ring, 12 constellation points on the next outer ring, and 16 constellation points on the outer-most ring). The bit labeling and [x, y] signal point coordinates (where the outer ring is rotated by n/16 as compared to the DVB-S2 32APSK constellation) of this 32APSK constellation are as follows (where ε_(x) represents average energy per symbol, 4*R1²+12*R2²+16*R3²=32, and R1 represents the radius of the inner-most ring, R2 represents the radius of the middle ring and R3 represents the radius of the outer ring), as further illustrated in FIG. 4A:

Bit Label [x, y] Coordinates 00000 [−R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0)] 00001 [−R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(π/16.0)] 00010 [R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0)] 00011 [R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(π/16.0)] 00100 [−R2 * {square root over (ε_(x))} * sin(π/4.0), R2 * {square root over (ε_(x))} * sin(π/4.0)] 00101 [−R2 * {square root over (ε_(x))} * sin(π/12.0), R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0)] 00110 [R2 * {square root over (ε_(x))} * sin(π/4.0), R2 * {square root over (ε_(x))} * sin(π/4.0)] 00111 [R2 * {square root over (ε_(x))} * sin(π/12.0), R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0)] 01000 [−R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0)] 01001 [−R3 * {square root over (ε_(x))} * cos(π/16.0), R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0)] 01010 [R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0), R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0)] 01011 [R3 * {square root over (ε_(x))} * cos(π/16.0), R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0)] 01100 [−R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0), R2 * {square root over (ε_(x))} * sin(π/12.0)] 01101 [−R1 * {square root over (ε_(x))} * sin(π/4.0), R1 * {square root over (ε_(x))} * sin(π/4.0)] 01110 [R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0), R2 * {square root over (ε_(x))} * sin(π/12.0)] 01111 [R1 * {square root over (ε_(x))} * sin(π/4.0), R1 * {square root over (ε_(x))} * sin(π/4.0)] 10000 [−R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0)] 10001 [−R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(π/16.0)] 10010 [R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0)] 10011 [R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(π/16.0)] 10100 [−R2 * {square root over (ε_(x))} * sin(π/4.0), −R2 * {square root over (ε_(x))} * sin(π/4.0)] 10101 [−R2 * {square root over (ε_(x))} * sin(π/12.0), −R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0)] 10110 [R2 * {square root over (ε_(x))} * sin(π/4.0), −R2 * {square root over (ε_(x))} * sin(π/4.0)] 10111 [R2 * {square root over (ε_(x))} * sin(π/12.0), −R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0)] 11000 [−R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0)] 11001 [−R3 * {square root over (ε_(x))} * cos(π/16.0), −R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0)] 11010 [R3 * {square root over (ε_(x))} * cos(3.0 * π/16.0), −R3 * {square root over (ε_(x))} * cos(5.0 * π/16.0)] 11011 [R3 * {square root over (ε_(x))} * cos(π/16.0), −R3 * {square root over (ε_(x))} * cos(7.0 * π/16.0)] 11100 [−R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0), −R2 * {square root over (ε_(x))} * sin(π/12.0)] 11101 [−R1 * {square root over (ε_(x))} * sin(π/4.0), −R1 * {square root over (ε_(x))} * sin(π/4.0)] 11110 [R2 * {square root over (ε_(x))} * sin(5.0 * π/12.0), −R2 * {square root over (ε_(x))} * sin(π/12.0)] 11111 [R1 * {square root over (ε_(x))} * sin(π/4.0), −R1 * {square root over (ε_(x))} * sin(π/4.0)]

This 32APSK constellation achieves improved performance over other current 32APSK modulation constellations (e.g., approximately 0.2 dB better performance over the 32APSK constellation of the DVB-S2 standard). Despite the better performance of this constellation, however, to maintain compatibility with the DVB-S2 standard (and preserve the 32APSK modcods thereof), the 32APSK constellation may be applied with only those new codes (and respective code rates), provided pursuant to the exemplary embodiments of the present invention, disclosed herein. As is evident, though, this 32APSK constellation could be applied with other codes (and respective code rates), such as those provided in the DVB-S2 standard.

The 64APSK signal constellation is provided for higher E_(s)/N₀ with a ring format of 8+16+20+20 (8 constellation points on the inner-most ring, 16 constellation points on the next outer ring, 20 constellation points on the next outer ring, and 20 constellation points on the outer-most ring). The bit labeling and [x, y] signal point coordinates of this 64APSK constellation are as follows (where ε_(x) represents average energy per symbol, 8*R1²+16*R2²+20*R3²+20*R4²=64, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring (the first middle ring), R3 represents the radius of the next outer ring (the second middle ring) and R4 represents the radius of the outer-most ring), as further illustrated in FIG. 4B:

Bit Label [x, y] Coordinates 000000 [R2 * {square root over (ε_(x))} * cos(25.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(25.0 * π/16.0)], 000001 [R4 * {square root over (ε_(x))} * cos(35.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(35.0 * π/20.0)], 000010 [R2 * {square root over (ε_(x))} * cos(27.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(27.0 * π/16.0)], 000011 [R3 * {square root over (ε_(x))} * cos(35.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(35.0 * π/20.0)], 000100 [R4 * {square root over (ε_(x))} * cos(31.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(31.0 * π/20.0)], 000101 [R4 * {square root over (ε_(x))} * cos(33.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(33.0 * π/20.0)], 000110 [R3 * {square root over (ε_(x))} * cos(31.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(31.0 * π/20.0)], 000111 [R3 * {square root over (ε_(x))} * cos(33.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(33.0 * π/20.0)], 001000 [R2 * {square root over (ε_(x))} * cos(23.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(23.0 * π/16.0)], 001001 [R4 * {square root over (ε_(x))} * cos(25.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(25.0 * π/20.0)], 001010 [R2 * {square root over (ε_(x))} * cos(21.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(21.0 * π/16.0)], 001011 [R3 * {square root over (ε_(x))} * cos(25.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(25.0 * π/20.0)], 001100 [R4 * {square root over (ε_(x))} * cos(29.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(29.0 * π/20.0)], 001101 [R4 * {square root over (ε_(x))} * cos(27.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(27.0 * π/20.0)], 001110 [R3 * {square root over (ε_(x))} * cos(29.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(29.0 * π/20.0)], 001111 [R3 * {square root over (ε_(x))} * cos(27.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(27.0 * π/20.0)], 010000 [R1 * {square root over (ε_(x))} * cos(13.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(13.0 * π/8.0)], 010001 [R4 * {square root over (ε_(x))} * cos(37.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(37.0 * π/20.0)], 010010 [R2 * {square root over (ε_(x))} * cos(29.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(29.0 * π/16.0)], 010011 [R3 * {square root over (ε_(x))} * cos(37.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(37.0 * π/20.0)], 010100 [R1 * {square root over (ε_(x))} * cos(15.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(15.0 * π/8.0)], 010101 [R4 * {square root over (ε_(x))} * cos(39.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(39.0 * π/20.0)], 010110 [R2 * {square root over (ε_(x))} * cos(31.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(31.0 * π/16.0)], 010111 [R3 * {square root over (ε_(x))} * cos(39.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(39.0 * π/20.0)], 011000 [R1 * {square root over (ε_(x))} * cos(11.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(11.0 * π/8.0)], 011001 [R4 * {square root over (ε_(x))} * cos(23.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(23.0 * π/20.0)], 011010 [R2 * {square root over (ε_(x))} * cos(19.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(19.0 * π/16.0)], 011011 [R3 * {square root over (ε_(x))} * cos(23.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(23.0 * π/20.0)], 011100 [R1 * {square root over (ε_(x))} * cos(9.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(9.0 * π/8.0)], 011101 [R4 * {square root over (ε_(x))} * cos(21.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(21.0 * π/20.0)], 011110 [R2 * {square root over (ε_(x))} * cos(17.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(17.0 * π/16.0)], 011111 [R3 * {square root over (ε_(x))} * cos(21.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(21.0 * π/20.0)], 100000 [R2 * {square root over (ε_(x))} * cos(7.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(7.0 * π/16.0)], 100001 [R4 * {square root over (ε_(x))} * cos(5.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(5.0 * π/20.0)], 100010 [R2 * {square root over (ε_(x))} * cos(5.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(5.0 * π/16.0)], 100011 [R3 * {square root over (ε_(x))} * cos(5.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(5.0 * π/20.0)], 100100 [R4 * {square root over (ε_(x))} * cos(9.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(9.0 * π/20.0)], 100101 [R4 * {square root over (ε_(x))} * cos(7.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(7.0 * π/20.0)], 100110 [R3 * {square root over (ε_(x))} * cos(9.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(9.0 * π/20.0)], 100111 [R3 * {square root over (ε_(x))} * cos(7.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(7.0 * π/20.0)], 101000 [R2 * {square root over (ε_(x))} * cos(9.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(9.0 * π/16.0)], 101001 [R4 * {square root over (ε_(x))} * cos(15.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(15.0 * π/20.0)], 101010 [R2 * {square root over (ε_(x))} * cos(11.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(11.0 * π/16.0)], 101011 [R3 * {square root over (ε_(x))} * cos(15.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(15.0 * π/20.0)], 101100 [R4 * {square root over (ε_(x))} * cos(11.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(11.0 * π/20.0)], 101101 [R4 * {square root over (ε_(x))} * cos(13.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(13.0 * π/20.0)], 101110 [R3 * {square root over (ε_(x))} * cos(11.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(11.0 * π/20.0)], 101111 [R3 * {square root over (ε_(x))} * cos(13.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(13.0 * π/20.0)], 110000 [R1 * {square root over (ε_(x))} * cos(3.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(3.0 * π/8.0)], 110001 [R4 * {square root over (ε_(x))} * cos(3.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(3.0 * π/20.0)], 110010 [R2 * {square root over (ε_(x))} * cos(3.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(3.0 * π/16.0)], 110011 [R3 * {square root over (ε_(x))} * cos(3.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(3.0 * π/20.0)], 110100 [R1 * {square root over (ε_(x))} * cos(π/8.0), R1 * {square root over (ε_(x))} * sin(π/8.0)], 110101 [R4 * {square root over (ε_(x))} * cos(π/20.0), R4 * {square root over (ε_(x))} * sin(π/20.0)], 110110 [R2 * {square root over (ε_(x))} * cos(π/16.0), R2 * {square root over (ε_(x))} * sin(π/16.0)], 110111 [R3 * {square root over (ε_(x))} * cos(π/20.0), R3 * {square root over (ε_(x))} * sin(π/20.0)], 111000 [R1 * {square root over (ε_(x))} * cos(5.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(5.0 * π/8.0)], 111001 [R4 * {square root over (ε_(x))} * cos(17.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(17.0 * π/20.0)], 111010 [R2 * {square root over (ε_(x))} * cos(13.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(13.0 * π/16.0)], 111011 [R3 * {square root over (ε_(x))} * cos(17.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(17.0 * π/20.0)], 111100 [R1 * {square root over (ε_(x))} * cos(7.0 * π/8.0), R1 * {square root over (ε_(x))} * sin(7.0 * π/8.0)], 111101 [R4 * {square root over (ε_(x))} * cos(19.0 * π/20.0), R4 * {square root over (ε_(x))} * sin(19.0 * π/20.0)], 111110 [R2 * {square root over (ε_(x))} * cos(15.0 * π/16.0), R2 * {square root over (ε_(x))} * sin(15.0 * π/16.0)], 111111 [R3 * {square root over (ε_(x))} * cos(19.0 * π/20.0), R3 * {square root over (ε_(x))} * sin(19.0 * π/20.0)].

As specified above, however, current modulation and coding schemes (e.g., the modulation and coding schemes of the DVB-S2 standard) lack support for the operational requirements of terminals at relatively low E_(s)/N₀ ratios (e.g., below approximately −3 dB), and lack support for the operational requirements of terminals at relatively high E_(s)/N₀ ratios (e.g., above approximately 15.5 dB). Additionally, such current modulation and coding schemes also lack sufficient granularity for terminals within an intermediate E_(s)/N₀ operational range (e.g., from approximately −3 dB to 15.5 dB). For example, current modulation and coding schemes (e.g., those of the DVB-S2 standard) provide the following respective E_(s)/N₀ operation levels:

TABLE 5a ModCod Operation QPSK Modulation: E_(s)/N₀ AWGN Code Rate Operation (dB) QPSK: 1/4 −2.86 QPSK: 1/3 −1.68 QPSK: 2/5 −0.84 QPSK: 1/2 0.55 QPSK: 3/5 1.77 QPSK: 2/3 2.66 QPSK: 3/4 3.63 QPSK: 4/5 4.25 QPSK: 5/6 4.74 QPSK: 8/9 5.79 QPSK: 9/10 6.0

TABLE 5b ModCod Operation 8PSK Modulation: E_(s)/N₀ AWGN Code Rate Operation (dB) 8PSK: 3/5 5.05 8PSK: 2/3 6.12 8PSK: 3/4 7.45 8PSK: 5/6 8.87 8PSK: 8/9 10.23 8PSK: 9/10 10.52

TABLE 5c ModCod Operation 16APSK, 32APSK Modulation: E_(s)/N₀ AWGN Code Rate Operation (dB) 16APSK: 2/3 8.51 16APSK: 3/4 9.75 16APSK: 4/5 10.57 16APSK: 5/6 11.16 16APSK: 8/9 12.43 16APSK: 9/10 12.68 32APSK: 3/4 12.28 32APSK: 4/5 13.19 32APSK: 5/6 13.78 32APSK: 8/9 15.19 32APSK: 9/10 15.47

In accordance with exemplary embodiments of the present invention, therefore, modulation and coding schemes are provided that support terminals with operational requirements at relatively low E_(s)/N₀ ratios (e.g., within the range of approximately −3 dB to −10 dB) and at relatively high (E_(s)/N₀) ratios (e.g., within the range of approximately 15.5 dB to 24 dB), and that provide finer granularity for terminals with operational requirements within an intermediate operational range (e.g., approximately −3 dB to 15.5 dB). For example, exemplary embodiments provide the following new improved modulation and coding schemes with the respective E_(s)/N₀ operation levels:

TABLE 6a ModCod Operation (Low E_(s)/N₀) Long/Short FEC Modulation: E_(s)/N₀ AWGN Frame Code Rate Operation (dB) Long π/2 BPSK: 1/5 −10.07 (repeat 2x) Long π/2 BPSK: 1/4 −8.88 (repeat 2x) Long BPSK: 1/5 −7.06 Long BPSK: 1/4 −5.87 Long BPSK: 1/3 −4.70 Long QPSK: 2/9 −3.54 Short QPSK: 2/9 −3.32

TABLE 6b ModCod Operation (Intermediate E_(s)/N₀) (within range of DVB-S2) Long/Short FEC Modulation: E_(s)/N₀ AWGN Frame Code Rate Operation (dB) Long QPSK: 13/45 −2.44 Short QPSK: 13/45 −2.15 Long QPSK: 9/20 −0.19 Long QPSK: 11/20 1.04 Short QPSK: 11/20 1.30 Long 8PSK: 23/36 5.71 Short 8PSK: 23/36 6.01 Long 8PSK: 25/36 6.61 Long 16APSK: 19/36 6.22 Long 16APSK: 11/20 6.59 Short 16APSK: 19/36 6.65 Short 8PSK: 25/36 6.88 Short 16APSK: 11/20 6.89 Long 8PSK: 13/18 7.08 Long 16APSK: 26/45 7.10 Short 8PSK: 13/18 7.35 Short 16APSK: 26/45 7.35 Long 16APSK: 3/5 7.39 Long 16APSK: 28/45 7.69 Short 16APSK: 28/45 7.95 Long 16APSK: 23/36 7.97 Short 16APSK: 23/36 8.22 Long 16APSK: 25/36 8.86 Short 16APSK: 25/36 9.15 Long 16APSK: 13/18 9.30 Short 16APSK: 13/18 9.59 Long 16APSK: 7/9 10.19 Long 32APSK: 2/3 10.70 Long 16APSK: 31/36 11.67 Long 32APSK: 13/18 11.65 Short 32APSK: 13/18 11.95 Long 32APSK: 7/9 12.63 Long 64APSK: 13/18 14.01 Short 64APSK: 13/18 14.35 Long 64APSK: 3/4 14.47 Long 64APSK: 7/9 15.06 Long 64APSK: 4/5 15.46

TABLE 6c ModCod Operation (High E_(s)/N₀ ) Long/Short FEC Modulation: E_(s)/N₀ AWGN Frame Code Rate Operation (dB) Long 64APSK: 5/6 16.14 Long 64APSK: 31/36 16.82 Short 64APSK: 31/36 17.11 Long 256APSK: 2/3 17.51 Long 256APSK: 25/36 18.31 Short 256APSK: 25/36 18.75 Long 256APSK: 13/18 19.06 Short 256APSK: 13/18 19.45 Long 256APSK: 3/4 19.79 Long 256APSK: 7/9 20.62 Long 256APSK: 4/5 21.38 Long 256APSK: 5/6 22.45 Long 256APSK: 31/36 23.39

With respect to modulation, exemplary embodiments of the present invention provide certain new signal constellations. According to one embodiment, for relatively high E_(s)/N₀ regions, a new 256APSK constellation is provided with a ring format of 32+32+64+64+64 (32 constellation points on the inner-most ring, 32 constellation points on the next outer ring, 64 constellation points on the next outer ring, 64 constellation points on the next outer ring, and 64 constellation points on the outer-most ring). The bit labeling and [x, y] signal point coordinates of this 256APSK constellation are as follows (where ε_(s) represents average energy per symbol, 32*R1²+32*R2²+64*R3²+64*R4²+64*R5²=256, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring, R3 represents the radius of the next outer ring, R4 represents the radius of the next outer ring, and R5 represents the radius of the outer-most ring):

Bit Label [x, y] Coordinates 00000000 [R2 * {square root over (ε_(s))} * cos(π/32.0), R2 * {square root over (ε_(s))} * sin(π/32.0)] 00000001 [R1 * {square root over (ε_(s))} * cos(π/32.0), R1 * {square root over (ε_(s))} * sin(π/32.0)] 00000010 [R2 * {square root over (ε_(s))} * cos(3 * π/32.0), R2 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000011 [R1 * {square root over (ε_(s))} * cos(3 * π/32.0), R1 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000100 [R2 * {square root over (ε_(s))} * cos(7 * π/32.0), R2 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000101 [R1 * {square root over (ε_(s))} * cos(7 * π/32.0), R1 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000110 [R2 * {square root over (ε_(s))} * cos(5 * π/32.0), R2 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00000111 [R1 * {square root over (ε_(s))} * cos(5 * π/32.0), R1 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00001000 [R2 * {square root over (ε_(s))} * cos(15 * π/32.0), R2 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001001 [R1 * {square root over (ε_(s))} * cos(15 * π/32.0), R1 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001010 [R2 * {square root over (ε_(s))} * cos(13 * π/32.0), R2 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001011 [R1 * {square root over (ε_(s))} * cos(13 * π/32.0), R1 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001100 [R2 * {square root over (ε_(s))} * cos(9 * π/32.0), R2 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001101 [R1 * {square root over (ε_(s))} * cos(9 * π/32.0), R1 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001110 [R2 * {square root over (ε_(s))} * cos(11 * π/32.0), R2 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00001111 [R1 * {square root over (ε_(s))} * cos(11 * π/32.0), R1 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00010000 [R3 * {square root over (ε_(s))} * cos(π/64.0), R3 * {square root over (ε_(s))} * sin(π/64.0)] 00010001 [R3 * {square root over (ε_(s))} * cos(3 * π/64.0), R3 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00010010 [R3 * {square root over (ε_(s))} * cos(7 * π/64.0), R3 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00010011 [R3 * {square root over (ε_(s))} * cos(5 * π/64.0), R3 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00010100 [R3 * {square root over (ε_(s))} * cos(15 * π/64.0), R3 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00010101 [R3 * {square root over (ε_(s))} * cos(13 * π/64.0), R3 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00010110 [R3 * {square root over (ε_(s))} * cos(9 * π/64.0), R3 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00010111 [R3 * {square root over (ε_(s))} * cos(11 * π/64.0), R3 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00011000 [R3 * {square root over (ε_(s))} * cos(31 * π/64.0), R3 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00011001 [R3 * {square root over (ε_(s))} * cos(29 * π/64.0), R3 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00011010 [R3 * {square root over (ε_(s))} * cos(25 * π/64.0), R3 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00011011 [R3 * {square root over (ε_(s))} * cos(27 * π/64.0), R3 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00011100 [R3 * {square root over (ε_(s))} * cos(17 * π/64.0), R3 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00011101 [R3 * {square root over (ε_(s))} * cos(19 * π/64.0), R3 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00011110 [R3 * {square root over (ε_(s))} * cos(23 * π/64.0), R3 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00011111 [R3 * {square root over (ε_(s))} * cos(21 * π/64.0), R3 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00100000 [R5 * {square root over (ε_(s))} * cos(π/64.0), R5 * {square root over (ε_(s))} * sin(π/64.0)] 00100001 [R5 * {square root over (ε_(s))} * cos(3 * π/64.0), R5 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00100010 [R5 * {square root over (ε_(s))} * cos(7 * π/64.0), R5 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00100011 [R5 * {square root over (ε_(s))} * cos(5 * π/64.0), R5 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00100100 [R5 * {square root over (ε_(s))} * cos(15 * π/64.0), R5 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00100101 [R5 * {square root over (ε_(s))} * cos(13 * π/64.0), R5 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00100110 [R5 * {square root over (ε_(s))} * cos(9 * π/64.0), R5 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00100111 [R5 * {square root over (ε_(s))} * cos(11 * π/64.0), R5 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00101000 [R5 * {square root over (ε_(s))} * cos(31 * π/64.0), R5 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00101001 [R5 * {square root over (ε_(s))} * cos(29 * π/64.0), R5 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00101010 [R5 * {square root over (ε_(s))} * cos(25 * π/64.0), R5 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00101011 [R5 * {square root over (ε_(s))} * cos(27 * π/64.0), R5 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00101100 [R5 * {square root over (ε_(s))} * cos(17 * π/64.0), R5 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00101101 [R5 * {square root over (ε_(s))} * cos(19 * π/64.0), R5 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00101110 [R5 * {square root over (ε_(s))} * cos(23 * π/64.0), R5 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00101111 [R5 * {square root over (ε_(s))} * cos(21 * π/64.0), R5 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00110000 [R4 * {square root over (ε_(s))} * cos(π/64.0), R4 * {square root over (ε_(s))} * sin(π/64.0)] 00110001 [R4 * {square root over (ε_(s))} * cos(3 * π/64.0), R4 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00110010 [R4 * {square root over (ε_(s))} * cos(7 * π/64.0), R4 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00110011 [R4 * {square root over (ε_(s))} * cos(5 * π/64.0), R4 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00110100 [R4 * {square root over (ε_(s))} * cos(15 * π/64.0), R4 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00110101 [R4 * {square root over (ε_(s))} * cos(13 * π/64.0), R4 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00110110 [R4 * {square root over (ε_(s))} * cos(9 * π/64.0), R4 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00110111 [R4 * {square root over (ε_(s))} * cos(11 * π/64.0), R4 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00111000 [R4 * {square root over (ε_(s))} * cos(31 * π/64.0), R4 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00111001 [R4 * {square root over (ε_(s))} * cos(29 * π/64.0), R4 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00111010 [R4 * {square root over (ε_(s))} * cos(25 * π/64.0), R4 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00111011 [R4 * {square root over (ε_(s))} * cos(27 * π/64.0), R4 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00111100 [R4 * {square root over (ε_(s))} * cos(17 * π/64.0), R4 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00111101 [R4 * {square root over (ε_(s))} * cos(19 * π/64.0), R4 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00111110 [R4 * {square root over (ε_(s))} * cos(23 * π/64.0), R4 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00111111 [R4 * {square root over (ε_(s))} * cos(21 * π/64.0), R4 * {square root over (ε_(s))} * sin(21 * π/64.0)] 01000000 [R2 * {square root over (ε_(s))} * cos(31 * π/32.0), R2 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000001 [R1 * {square root over (ε_(s))} * cos(31 * π/32.0), R1 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000010 [R2 * {square root over (ε_(s))} * cos(29 * π/32.0), R2 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000011 [R1 * {square root over (ε_(s))} * cos(29 * π/32.0), R1 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000100 [R2 * {square root over (ε_(s))} * cos(25 * π/32.0), R2 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000101 [R1 * {square root over (ε_(s))} * cos(25 * π/32.0), R1 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000110 [R2 * {square root over (ε_(s))} * cos(27 * π/32.0), R2 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01000111 [R1 * {square root over (ε_(s))} * cos(27 * π/32.0), R1 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01001000 [R2 * {square root over (ε_(s))} * cos(17 * π/32.0), R2 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001001 [R1 * {square root over (ε_(s))} * cos(17 * π/32.0), R1 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001010 [R2 * {square root over (ε_(s))} * cos(19 * π/32.0), R2 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001011 [R1 * {square root over (ε_(s))} * cos(19 * π/32.0), R1 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001100 [R2 * {square root over (ε_(s))} * cos(23 * π/32.0), R2 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001101 [R1 * {square root over (ε_(s))} * cos(23 * π/32.0), R1 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001110 [R2 * {square root over (ε_(s))} * cos(21 * π/32.0), R2 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01001111 [R1 * {square root over (ε_(s))} * cos(21 * π/32.0), R1 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01010000 [R3 * {square root over (ε_(s))} * cos(63 * π/64.0), R3 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01010001 [R3 * {square root over (ε_(s))} * cos(61 * π/64.0), R3 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01010010 [R3 * {square root over (ε_(s))} * cos(57 * π/64.0), R3 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01010011 [R3 * {square root over (ε_(s))} * cos(59 * π/64.0), R3 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01010100 [R3 * {square root over (ε_(s))} * cos(49 * π/64.0), R3 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01010101 [R3 * {square root over (ε_(s))} * cos(51 * π/64.0), R3 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01010110 [R3 * {square root over (ε_(s))} * cos(55 * π/64.0), R3 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01010111 [R3 * {square root over (ε_(s))} * cos(53 * π/64.0), R3 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01011000 [R3 * {square root over (ε_(s))} * cos(33 * π/64.0), R3 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01011001 [R3 * {square root over (ε_(s))} * cos(35 * π/64.0), R3 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01011010 [R3 * {square root over (ε_(s))} * cos(39 * π/64.0), R3 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01011011 [R3 * {square root over (ε_(s))} * cos(37 * π/64.0), R3 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01011100 [R3 * {square root over (ε_(s))} * cos(47 * π/64.0), R3 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01011101 [R3 * {square root over (ε_(s))} * cos(45 * π/64.0), R3 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01011110 [R3 * {square root over (ε_(s))} * cos(41 * π/64.0), R3 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01011111 [R3 * {square root over (ε_(s))} * cos(43 * π/64.0), R3 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01100000 [R5 * {square root over (ε_(s))} * cos(63 * π/64.0), R5 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01100001 [R5 * {square root over (ε_(s))} * cos(61 * π/64.0), R5 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01100010 [R5 * {square root over (ε_(s))} * cos(57 * π/64.0), R5 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01100011 [R5 * {square root over (ε_(s))} * cos(59 * π/64.0), R5 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01100100 [R5 * {square root over (ε_(s))} * cos(49 * π/64.0), R5 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01100101 [R5 * {square root over (ε_(s))} * cos(51 * π/64.0), R5 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01100110 [R5 * {square root over (ε_(s))} * cos(55 * π/64.0), R5 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01100111 [R5 * {square root over (ε_(s))} * cos(53 * π/64.0), R5 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01101000 [R5 * {square root over (ε_(s))} * cos(33 * π/64.0), R5 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01101001 [R5 * {square root over (ε_(s))} * cos(35 * π/64.0), R5 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01101010 [R5 * {square root over (ε_(s))} * cos(39 * π/64.0), R5 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01101011 [R5 * {square root over (ε_(s))} * cos(37 * π/64.0), R5 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01101100 [R5 * {square root over (ε_(s))} * cos(47 * π/64.0), R5 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01101101 [R5 * {square root over (ε_(s))} * cos(45 * π/64.0), R5 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01101110 [R5 * {square root over (ε_(s))} * cos(41 * π/64.0), R5 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01101111 [R5 * {square root over (ε_(s))} * cos(43 * π/64.0), R5 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01110000 [R4 * {square root over (ε_(s))} * cos(63 * π/64.0), R4 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01110001 [R4 * {square root over (ε_(s))} * cos(61 * π/64.0), R4 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01110010 [R4 * {square root over (ε_(s))} * cos(57 * π/64.0), R4 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01110011 [R4 * {square root over (ε_(s))} * cos(59 * π/64.0), R4 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01110100 [R4 * {square root over (ε_(s))} * cos(49 * π/64.0), R4 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01110101 [R4 * {square root over (ε_(s))} * cos(51 * π/64.0), R4 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01110110 [R4 * {square root over (ε_(s))} * cos(55 * π/64.0), R4 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01110111 [R4 * {square root over (ε_(s))} * cos(53 * π/64.0), R4 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01111000 [R4 * {square root over (ε_(s))} * cos(33 * π/64.0), R4 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01111001 [R4 * {square root over (ε_(s))} * cos(35 * π/64.0), R4 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01111010 [R4 * {square root over (ε_(s))} * cos(39 * π/64.0), R4 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01111011 [R4 * {square root over (ε_(s))} * cos(37 * π/64.0), R4 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01111100 [R4 * {square root over (ε_(s))} * cos(47 * π/64.0), R4 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01111101 [R4 * {square root over (ε_(s))} * cos(45 * π/64.0), R4 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01111110 [R4 * {square root over (ε_(s))} * cos(41 * π/64.0), R4 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01111111 [R4 * {square root over (ε_(s))} * cos(43 * π/64.0), R4 * {square root over (ε_(s))} * sin(43 * π/64.0)] 10000000 [R2 * {square root over (ε_(s))} * cos(63 * π/32.0), R2 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000001 [R1 * {square root over (ε_(s))} * cos(63 * π/32.0), R1 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000010 [R2 * {square root over (ε_(s))} * cos(61 * π/32.0), R2 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000011 [R1 * {square root over (ε_(s))} * cos(61 * π/32.0), R1 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000100 [R2 * {square root over (ε_(s))} * cos(57 * π/32.0), R2 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000101 [R1 * {square root over (ε_(s))} * cos(57 * π/32.0), R1 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000110 [R2 * {square root over (ε_(s))} * cos(59 * π/32.0), R2 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10000111 [R1 * {square root over (ε_(s))} * cos(59 * π/32.0), R1 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10001000 [R2 * {square root over (ε_(s))} * cos(49 * π/32.0), R2 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001001 [R1 * {square root over (ε_(s))} * cos(49 * π/32.0), R1 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001010 [R2 * {square root over (ε_(s))} * cos(51 * π/32.0), R2 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001011 [R1 * {square root over (ε_(s))} * cos(51 * π/32.0), R1 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001100 [R2 * {square root over (ε_(s))} * cos(55 * π/32.0), R2 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001101 [R1 * {square root over (ε_(s))} * cos(55 * π/32.0), R1 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001110 [R2 * {square root over (ε_(s))} * cos(53 * π/32.0), R2 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10001111 [R1 * {square root over (ε_(s))} * cos(53 * π/32.0), R1 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10010000 [R3 * {square root over (ε_(s))} * cos(127 * π/64.0), R3 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10010001 [R3 * {square root over (ε_(s))} * cos(125 * π/64.0), R3 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10010010 [R3 * {square root over (ε_(s))} * cos(121 * π/64.0), R3 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10010011 [R3 * {square root over (ε_(s))} * cos(123 * π/64.0), R3 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10010100 [R3 * {square root over (ε_(s))} * cos(113 * π/64.0), R3 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10010101 [R3 * {square root over (ε_(s))} * cos(115 * π/64.0), R3 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10010110 [R3 * {square root over (ε_(s))} * cos(119 * π/64.0), R3 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10010111 [R3 * {square root over (ε_(s))} * cos(117 * π/64.0), R3 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10011000 [R3 * {square root over (ε_(s))} * cos(97 * π/64.0), R3 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10011001 [R3 * {square root over (ε_(s))} * cos(99 * π/64.0), R3 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10011010 [R3 * {square root over (ε_(s))} * cos(103 * π/64.0), R3 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10011011 [R3 * {square root over (ε_(s))} * cos(101 * π/64.0), R3 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10011100 [R3 * {square root over (ε_(s))} * cos(111 * π/64.0), R3 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10011101 [R3 * {square root over (ε_(s))} * cos(109 * π/64.0), R3 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10011110 [R3 * {square root over (ε_(s))} * cos(105 * π/64.0), R3 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10011111 [R3 * {square root over (ε_(s))} * cos(107 * π/64.0), R3 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10100000 [R5 * {square root over (ε_(s))} * cos(127 * π/64.0), R5 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10100001 [R5 * {square root over (ε_(s))} * cos(125 * π/64.0), R5 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10100010 [R5 * {square root over (ε_(s))} * cos(121 * π/64.0), R5 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10100011 [R5 * {square root over (ε_(s))} * cos(123 * π/64.0), R5 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10100100 [R5 * {square root over (ε_(s))} * cos(113 * π/64.0), R5 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10100101 [R5 * {square root over (ε_(s))} * cos(115 * π/64.0), R5 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10100110 [R5 * {square root over (ε_(s))} * cos(119 * π/64.0), R5 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10100111 [R5 * {square root over (ε_(s))} * cos(117 * π/64.0), R5 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10101000 [R5 * {square root over (ε_(s))} * cos(97 * π/64.0), R5 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10101001 [R5 * {square root over (ε_(s))} * cos(99 * π/64.0), R5 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10101010 [R5 * {square root over (ε_(s))} * cos(103 * π/64.0), R5 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10101011 [R5 * {square root over (ε_(s))} * cos(101 * π/64.0), R5 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10101100 [R5 * {square root over (ε_(s))} * cos(111 * π/64.0), R5 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10101101 [R5 * {square root over (ε_(s))} * cos(109 * π/64.0), R5 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10101110 [R5 * {square root over (ε_(s))} * cos(105 * π/64.0), R5 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10101111 [R5 * {square root over (ε_(s))} * cos(107 * π/64.0), R5 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10110000 [R4 * {square root over (ε_(s))} * cos(127 * π/64.0), R4 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10110001 [R4 * {square root over (ε_(s))} * cos(125 * π/64.0), R4 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10110010 [R4 * {square root over (ε_(s))} * cos(121 * π/64.0), R4 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10110011 [R4 * {square root over (ε_(s))} * cos(123 * π/64.0), R4 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10110100 [R4 * {square root over (ε_(s))} * cos(113 * π/64.0), R4 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10110101 [R4 * {square root over (ε_(s))} * cos(115 * π/64.0), R4 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10110110 [R4 * {square root over (ε_(s))} * cos(119 * π/64.0), R4 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10110111 [R4 * {square root over (ε_(s))} * cos(117 * π/64.0), R4 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10111000 [R4 * {square root over (ε_(s))} * cos(97 * π/64.0), R4 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10111001 [R4 * {square root over (ε_(s))} * cos(99 * π/64.0), R4 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10111010 [R4 * {square root over (ε_(s))} * cos(103 * π/64.0), R4 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10111011 [R4 * {square root over (ε_(s))} * cos(101 * π/64.0), R4 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10111100 [R4 * {square root over (ε_(s))} * cos(111 * π/64.0), R4 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10111101 [R4 * {square root over (ε_(s))} * cos(109 * π/64.0), R4 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10111110 [R4 * {square root over (ε_(s))} * cos(105 * π/64.0), R4 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10111111 [R4 * {square root over (ε_(s))} * cos(107 * π/64.0), R4 * {square root over (ε_(s))} * sin(107 * π/64.0)] 11000000 [R2 * {square root over (ε_(s))} * cos(33 * π/32.0), R2 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000001 [R1 * {square root over (ε_(s))} * cos(33 * π/32.0), R1 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000010 [R2 * {square root over (ε_(s))} * cos(35 * π/32.0), R2 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000011 [R1 * {square root over (ε_(s))} * cos(35 * π/32.0), R1 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000100 [R2 * {square root over (ε_(s))} * cos(39 * π/32.0), R2 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000101 [R1 * {square root over (ε_(s))} * cos(39 * π/32.0), R1 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000110 [R2 * {square root over (ε_(s))} * cos(37 * π/32.0), R2 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11000111 [R1 * {square root over (ε_(s))} * cos(37 * π/32.0), R1 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11001000 [R2 * {square root over (ε_(s))} * cos(47 * π/32.0), R2 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001001 [R1 * {square root over (ε_(s))} * cos(47 * π/32.0), R1 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001010 [R2 * {square root over (ε_(s))} * cos(45 * π/32.0), R2 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001011 [R1 * {square root over (ε_(s))} * cos(45 * π/32.0), R1 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001100 [R2 * {square root over (ε_(s))} * cos(41 * π/32.0), R2 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001101 [R1 * {square root over (ε_(s))} * cos(41 * π/32.0), R1 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001110 [R2 * {square root over (ε_(s))} * cos(43 * π/32.0), R2 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11001111 [R1 * {square root over (ε_(s))} * cos(43 * π/32.0), R1 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11010000 [R3 * {square root over (ε_(s))} * cos(65 * π/64.0), R3 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11010001 [R3 * {square root over (ε_(s))} * cos(67 * π/64.0), R3 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11010010 [R3 * {square root over (ε_(s))} * cos(71 * π/64.0), R3 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11010011 [R3 * {square root over (ε_(s))} * cos(69 * π/64.0), R3 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11010100 [R3 * {square root over (ε_(s))} * cos(79 * π/64.0), R3 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11010101 [R3 * {square root over (ε_(s))} * cos(77 * π/64.0), R3 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11010110 [R3 * {square root over (ε_(s))} * cos(73 * π/64.0), R3 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11010111 [R3 * {square root over (ε_(s))} * cos(75 * π/64.0), R3 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11011000 [R3 * {square root over (ε_(s))} * cos(95 * π/64.0), R3 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11011001 [R3 * {square root over (ε_(s))} * cos(93 * π/64.0), R3 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11011010 [R3 * {square root over (ε_(s))} * cos(89 * π/64.0), R3 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11011011 [R3 * {square root over (ε_(s))} * cos(91 * π/64.0), R3 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11011100 [R3 * {square root over (ε_(s))} * cos(81 * π/64.0), R3 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11011101 [R3 * {square root over (ε_(s))} * cos(83 * π/64.0), R3 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11011110 [R3 * {square root over (ε_(s))} * cos(87 * π/64.0), R3 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11011111 [R3 * {square root over (ε_(s))} * cos(85 * π/64.0), R3 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11100000 [R5 * {square root over (ε_(s))} * cos(65 * π/64.0), R5 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11100001 [R5 * {square root over (ε_(s))} * cos(67 * π/64.0), R5 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11100010 [R5 * {square root over (ε_(s))} * cos(71 * π/64.0), R5 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11100011 [R5 * {square root over (ε_(s))} * cos(69 * π/64.0), R5 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11100100 [R5 * {square root over (ε_(s))} * cos(79 * π/64.0), R5 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11100101 [R5 * {square root over (ε_(s))} * cos(77 * π/64.0), R5 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11100110 [R5 * {square root over (ε_(s))} * cos(73 * π/64.0), R5 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11100111 [R5 * {square root over (ε_(s))} * cos(75 * π/64.0), R5 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11101000 [R5 * {square root over (ε_(s))} * cos(95 * π/64.0), R5 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11101001 [R5 * {square root over (ε_(s))} * cos(93 * π/64.0), R5 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11101010 [R5 * {square root over (ε_(s))} * cos(89 * π/64.0), R5 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11101011 [R5 * {square root over (ε_(s))} * cos(91 * π/64.0), R5 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11101100 [R5 * {square root over (ε_(s))} * cos(81 * π/64.0), R5 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11101101 [R5 * {square root over (ε_(s))} * cos(83 * π/64.0), R5 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11101110 [R5 * {square root over (ε_(s))} * cos(87 * π/64.0), R5 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11101111 [R5 * {square root over (ε_(s))} * cos(85 * π/64.0), R5 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11110000 [R4 * {square root over (ε_(s))} * cos(65 * π/64.0), R4 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11110001 [R4 * {square root over (ε_(s))} * cos(67 * π/64.0), R4 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11110010 [R4 * {square root over (ε_(s))} * cos(71 * π/64.0), R4 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11110011 [R4 * {square root over (ε_(s))} * cos(69 * π/64.0), R4 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11110100 [R4 * {square root over (ε_(s))} * cos(79 * π/64.0), R4 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11110101 [R4 * {square root over (ε_(s))} * cos(77 * π/64.0), R4 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11110110 [R4 * {square root over (ε_(s))} * cos(73 * π/64.0), R4 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11110111 [R4 * {square root over (ε_(s))} * cos(75 * π/64.0), R4 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11111000 [R4 * {square root over (ε_(s))} * cos(95 * π/64.0), R4 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11111001 [R4 * {square root over (ε_(s))} * cos(93 * π/64.0), R4 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11111010 [R4 * {square root over (ε_(s))} * cos(89 * π/64.0), R4 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11111011 [R4 * {square root over (ε_(s))} * cos(91 * π/64.0), R4 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11111100 [R4 * {square root over (ε_(s))} * cos(81 * π/64.0), R4 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11111101 [R4 * {square root over (ε_(s))} * cos(83 * π/64.0), R4 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11111110 [R4 * {square root over (ε_(s))} * cos(87 * π/64.0), R4 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11111111 [R4 * {square root over (ε_(s))} * cos(85 * π/64.0), R4 * {square root over (ε_(s))} * sin(85 * π/64.0)]

Additionally, with respect to the outer BCH coding of the FEC encoding, in accordance with exemplary embodiments of the present invention, the BCH t-error correcting capabilities are reflected in the following table:

Long/Short FEC Modulation: BCH t-Error Frame Code Rate Correction Long BPSK: 1/5 12 Long QPSK: 2/9 8 Short QPSK: 2/9 10 Long QPSK: 13/45 6 Short QPSK: 13/45 10 Long QPSK: 9/20 2 Long QPSK: 11/20 2 Short QPSK: 11/20 8 Long 8PSK: 23/36 2 Short 8PSK: 23/36 2 Long 8PSK: 25/36 0 Short 8PSK: 25/36 0 Long 8PSK: 13/18 0 Short 8PSK: 13/18 0 Long 16APSK: 19/36 6 Short 16APSK: 19/36 0 Long 16APSK: 11/20 2 Short 16APSK: 11/20 8 Long 16APSK: 26/45 6 Short 16APSK: 26/45 4 Long 16APSK: 3/5 0 Long 16APSK: 28/45 2 Short 16APSK: 28/45 6 Long 16APSK: 23/36 4 Short 16APSK: 23/36 6 Long 16APSK: 25/36 0 Short 16APSK: 25/36 2 Long 16APSK: 13/18 0 Short 16APSK: 13/18 0 Long 16APSK: 7/9 0 Long 16APSK: 31/36 0 Long 32APSK: 2/3 2 Long 32APSK: 13/18 0 Short 32APSK: 13/18 0 Long 32APSK: 7/9 0 Long 64APSK: 13/18 0 Short 64APSK: 13/18 0 Long 64APSK: 3/4 0 Long 64APSK: 7/9 0 Long 64APSK: 4/5 0 Long 64APSK: 5/6 0 Long 64APSK: 31/36 0 Short 64APSK: 31/36 8 Long 256APSK: 2/3 6 Long 256APSK: 25/36 10 Short 256APSK: 25/36 10 Long 256APSK: 13/18 6 Short 256APSK: 13/18 6 Long 256APSK: 3/4 4 Long 256APSK: 7/9 0 Long 256APSK: 4/5 0 Long 256APSK: 5/6 0 Long 256APSK: 31/36 0

Further, with respect to bit interleaving, exemplary embodiments of the present invention provide improved bit interleaving protocols. As specified above for the DVB-S2 standard, coded bits are written to the interleaver array column-by-column and read out row-by-row from left to right (except for the 8PSK 3/5 modcod—for which the bits are read out right to left). Referring to theses conventions as 0-1-2 for 8PSK, 0-1-2-3 for 16APSK, and 0-1-2-3-4 for 32APSK (and 2-1-0 for the 8PSK 3/5 modcod), according to embodiments of the present invention, the coded bits are similarly written to the interleaver array column-by-column, but are read out based on certain improved orders for the respective new modcods, as listed in the following table:

TABLE 7 Bit Interleaver Patterns Modulation: Bit Interleaver Modulation: Bit Interleaver Code Rate Pattern Code Rate Pattern QPSK: 13/45 N/A 32APSK: 13/18 3-0-2-1-4 QPSK: 9/20 N/A 32APSK: 7/9 1-0-2-3-4 QPSK: 11/20 N/A 64APSK: 13/18 4-1-2-5-0-3 8PSK: 23/36 0-1-2 64APSK: 3/4 2-3-5-0-4-1 8PSK: 25/36 1-0-2 64APSK: 7/9 2-0-1-5-4-3 8PSK: 13/18 1-0-2 64APSK: 4/5 1-2-4-0-5-3 16APSK: 19/36 0-3-1-2 64APSK: 5/6 4-2-1-0-5-3 16APSK: 11/20 2-1-3-0 64APSK: 31/36 2-3-4-0-5-1 16APSK: 26/45 3-2-0-1 256APSK: 2/3 1-3-2-4-7-6-5-0 16APSK: 3/5 3-2-1-0 256APSK: 25/36 4-2-3-5-1-0-6-7 16APSK: 28/45 3-0-1-2 256APSK: 13/18 4-5-3-2-1-0-7-6 16APSK: 23/36 3-0-2-1 256APSK: 3/4 5-1-2-4-3-6-0-7 16APSK: 25/36 2-3-1-0 256APSK: 7/9 2-1-3-5-4-0-6-7 16APSK: 13/18 3-0-2-1 256APSK: 4/5 1-3-4-2-7-0-5-6 16APSK: 7/9 0-3-2-1 256APSK: 5/6 3-5-6-1-2-4-0-7 32APSK: 2/3 2-1-4-3-0 256APSK: 31/36 3-4-1-2-6-0-7-5 16APSK: 31/36 1-0-3-2

With respect to the inner LDPC coding of the FEC encoding, in accordance with exemplary embodiments of the present invention, the respective parity bit accumulator address tables for the respective code rates and FEC Frame lengths are specified in the following tables (where, for each code rate R, the q values are as follows: (1) q=(n−k)/360, (where n=64800 and k=R*n); and (2) q=(n−k)/90, (where n=16200 and k=R*n)):

TABLE 8a (Rate 1/5) (n_(ldpc) = 64800) 30434 15118 35871 1042 34043 34085 42341 18485 44500 24268 28843 51748 21972 30300 24347 46808 8416 11111 41481 32215 4130 867 22576 9928 23980 15170 43863 15038 42905 19719 398 39956 47109 48347 26991 18214 24206 47552 15884 49234 51671 11523 41411 21249 16660 17729 852 21114 22858 19843 10501 37683 33159 15595 43687 9791 41121 30595 50762 36562 30611 6196 16501 1860 19594 45948 42827 9110 2671 44915 51640 33959 16649 37658 45143 11861 37 13823 3703 41861 6198 39321 37404 36745 7515 37433 17583 30253 42537 16920 44989 37745 27350 9903 13623 50660 35965 29455 36432 49774 8755 33362 12907 10543 34407 13960 9808 41065 17820 41780 13846 25968 45228 51694 1005 14230 7622 34849 38545 36256 10235 39642 27136 13787 42968 28454 9406 5612 9674 15364 45347 13550 44977 39547 37964 33817 48680 49571 37335 47548 45117 26148 17828 50113 9061 27964 47828 8518 12777 9523 45788 14839 30154 35408 42366 48162 32305 18501 34537 3974 41796 46590 39195 43248 28063 25179 21119 42374 46860 12591 49973 16248 31005 46401 45858 18919 39056 2622 31398 7488 40408 21230 7021 46583 18669 3999 46160 17929 25853 46018 16689 33374 14070 31593 44601 49986 25832 37105 12112 33290 8907 41215 28842 38633 191 17402 29860 28641 12889 28172 1706 23997 18785 3728 43051 43506 28074 20093 25247 4390 3534 35866 5423 48667 31399 44664 42319 17038 19121 2653 3699 43234 5448 2965 5554 6606 46032 10606 34309 48885 30552 28313 15011 35464 35537 42531 47350 49896 34368 50709 33315 29146 27506 37421 7219 5613 19620 22073 21932 40199 36978 30032 22322 39521 22458 18157 28917 42547 10696 22422 42365 45341 34234 4869 37037 6282 42657 1832 25254 24440 13374 34902 36356 9003 17404 29739 5586 29932

TABLE 8b (Rate 2/9) (n_(ldpc) = 64800) 5332 8018 35444 13098 9655 41945 44273 22741 9371 8727 43219 41410 43593 14611 46707 16041 1459 29246 12748 32996 676 46909 9340 35072 35640 17537 10512 44339 30965 25175 9918 21079 29835 3332 12088 47966 25168 50180 42842 40914 46726 17073 41812 34356 15159 2209 7971 22590 20020 27567 4853 10294 38839 15314 49808 20936 14497 23365 22630 38728 28361 34659 956 8559 44957 22222 28043 4641 25208 47039 30612 25796 14661 44139 27335 12884 6980 32584 33453 1867 20185 36106 30357 809 28513 46045 27862 4802 43744 13375 36066 23604 30766 6233 45051 23660 20815 19525 25207 27522 3854 9311 21925 41107 25773 26323 24237 24344 46187 44503 10256 20038 12177 26635 5214 14191 34404 45807 4938 4173 31344 32043 26501 46725 4648 16718 31060 26633 19036 14222 13886 26535 18103 8498 36814 34600 36495 36712 29833 27396 11877 42861 1834 36592 1645 3649 30521 14674 3630 890 13307 41412 24682 9907 4401 44543 13784 5828 32862 25179 29736 39614 5186 49749 38317 41460 39101 50080 40137 32691 26528 35332 44067 8467 14286 10470 12211 34019 37870 36918 36419 33153 50070 41498 47741 30538 12342 33751 23988 33624 41882 34075 25552 3106 17611 13190 29336 312 5667 35483 35460 16153 37267 28308 50009 46345 34204 32756 38243 5657 24157 36834 6890 49576 46244 43875 16738 47225 2944 36882 30341 48485 3700 14451 20438 18875 13634 41138 42962 46459 13369 27974 21493 14629 2369 11351 40226 42457 34749 39000 3912 18128 46776 47055 2221 26806 11345 35143 630 2229 44009 41295 34646 32163 16657 26544 31770 23641 43623 45826 10902 39490 7514 20480 28511 11429 19834 35430 50112 38163 5738 16191 16862 6783 6085 39149 34988 41497 32023 28688

TABLE 8c (Rate 13/45) (n_(ldpc) = 64800) 15210 4519 18217 34427 18474 16813 28246 17687 44527 31465 13004 43601 28576 13611 24294 15041 503 11393 26290 9278 19484 20742 13226 28322 32651 27323 22368 15522 37576 20607 20152 19741 26700 31696 21061 35991 44168 27910 31104 34776 38835 45450 40002 31522 7807 26330 2410 44983 15861 39215 14631 42584 26502 41864 27885 32276 29049 16878 37480 42550 38795 13012 7912 4058 23869 3325 42889 19921 13826 40323 18162 10005 35100 5483 7629 35166 1239 10772 5289 286 16172 41843 42612 38493 11997 40340 19047 16236 43557 9104 24032 2915 19265 36209 6443 40947 43527 29675 4195 31926 35392 20400 7515 45806 36068 33079 37325 6301 4580 20492 40934 14478 8238 2425 28901 43602 7224 17640 28259 6850 41859 14006 19132 5690 16223 11575 30562 44797 3759 9833 36529 21084 45546 16044 26763 13559 29092 41595 5726 13733 9164 15354 20145 10655 24076 40883 13424 30325 40589 32367 36270 9286 40151 8501 3871 22109 26239 29805 5358 44835 11609 3899 9760 39600 43422 13295 45431 14515 5392 37010 12386 40193 21492 45146 12376 41952 43153 45733 718 35726 33884 38006 16927 20958 25413 44561 11245 12984 35198 30977 31916 10657 1412 1048 14965 31879 29967 41000 32087 22 34773 768 27289 19898 43051 6964 31807 4119 33509 15950 6304 2813 35192 38282 39710 26356 9889 18957 6355 18770 40381 1876 38889 17958 20309 10744 1744 228 41543 36505 32795 12454 8520 4916 22313 1363 13010 8770 17057 8694 22987 29564 13804 3110 1382 33844 15117 42314 36045 25295 28421 22044 15951 42952 17458 6926 21257 41243 8662 17046 15054 15302 16964 40079 13359 45754 16715 9586 10960 25406 14675 8880 5087 12303 28993 13571 24824 31012 4121 808 30962 28736 11013 20488 7715 7637 6217 25114 23615 5760 5554 18072 21605 39242 24190 6592 12281 44681 6563 7001 18291 19605 33476 2884 30927 18430 23674 36414 30649 15364 22089 19757 41162 14454 17627 16676 28573 22163 8851 36803 27589 40049 476 1413 41013 34505 33296 29782 38018 42124 22625 7485 11772 2052 37567 14082 30106 43203 20858 7399 3796 22396 38745 792 44483 28268 33355 41030 30098 37269 12871 35769 33119 16738 3307 43434 13244 17852 9133 23190 35184 20115 24202 14760 43026 19425 26414 16821 6625 30362 35769 42608

TABLE 8d (Rate 9/20) (n_(ldpc) = 64800) 30649 35117 23181 15492 2367 31230 9368 13541 6608 23384 18300 5905 1961 8950 20589 17688 9641 1877 4937 15293 24864 14876 6516 10165 4229 26034 28862 8265 27847 3 22728 13946 27162 26003 17696 13261 31719 25669 17149 17377 33106 12630 4814 16334 1480 32952 11187 3849 30186 20938 7946 23283 11042 28080 26642 34560 11302 4991 5121 6879 13445 22794 18048 15116 5657 9853 15581 34960 13240 11176 17937 25081 4868 28235 30286 29706 7073 6773 10390 27002 13015 7388 14772 19581 11765 16642 11431 19588 20154 8027 29758 5501 6398 4268 21337 21136 2275 7899 25943 12939 14478 20369 22877 3591 12217 19130 24252 32444 24599 21382 4689 3524 11304 20423 13677 19639 10577 28279 22330 30722 21622 26233 3921 17722 6843 5999 8186 2355 33632 34632 30285 9616 19909 30417 19587 27853 13896 3689 155 20457 33362 21739 22779 33862 3713 32975 9403 2836 23109 11099 3505 14562 17309 26470 4843 12279 24216 26340 22073 32570 12936 19797 21801 8918 7999 24408 5783 25190 8817 29367 17017 6208 21402 2280 2110 7975 32039 34605 1235 912 23116 33017 31405 638 4707 31760 18043 3507 11989 26632 32829 11262 9274 2553 10697 13507 15323 27080 3752 33191 12363 24664 14068 1416 21670 26696 18570 25197 1517 7765 32686 6572 30901 28242 17802 24056 35388 26895 8023 31249 29290 13440 7156 17367 21472 27219 14447 9655 11100 27918 2900 33262 15301 4664 15728 1185 24818 32995 31108 16368 34978 31690 30464 13044 5492 10047 2768 14336 30880 32780 10993 24750 7022 19718 26036 19145 21177 33949 17135 5193 33718 2539 13920 25537 918 18514 14530 13699 11902 22721 8335 35346 24655 3332 14708 20822 11191 24064 32825 12321 11771 23299 31325 25526 16785 22212 34075 9066 31209 27819 5974 19918 26831 33338 26647 9480 28489 7827 18562 2401 17395 23192 10277 28458 23028 18793 10463 10740 616 24647 4153 10128 2873 22381 8132 18239 31614 4193 32313 7575 25801 27591 19872 17992 4609 9114 14764 13516 19192 9882 13112 16075 12510 28902 8784 32679 4578 34533 30609 25543 13739 3465 5330 999 33254 13085 5001 29061 28369 79 17750 13399 24851 9524 30966 10422 18251 34810 12259 25103 25193 16945 1059 11266 13612 30508 24778 25364 1322 14492 11111 13693 15125 8205 1749 8494 9902 9395 23936 3981 22799 28448 28076 26544 19652 13424 8915 2885 11356 3241 1609 10284 24350 2462 19358 15717 29327 15960 14743 5388 32927 1288 19074 6322 32214 34208 30535 35462 23415 20836 21819 17986 12196 30030 8422 2647 5710 3200 23132 23337 22307 29841 4813 15309 26942 29970 23288 7493 3005 20661 34283 33192 23033 9541 6424 22003 24665 5534 4684 1411 33340 26042 6426 3808 285 21942 14302 16023 6825 20084 34878 12295 32028 2591 178 24107 16379 2912 9912 15375 16120 28375 20170 726 11291 8185 13471 8448 23205 14239 17896 17950 19308 1591 3170 23836 18879 12853 10678 18431 21157 31624 3153 27682 12433 3458 312 4844 13138 17715 35138 15456 30507 33307 30783

TABLE 8e (Rate 19/36) (n_(ldpc) = 64800) 4852 21528 7920 5827 25497 26912 13790 5647 5349 26209 30575 10701 15230 6020 12821 18153 28229 23784 7846 2405 6175 25057 24745 11338 20902 7232 5966 20079 11898 7024 17575 30172 23114 7408 1444 10470 21964 6794 1849 19639 42 2805 10297 14296 17686 18756 6814 9207 13761 23515 17223 21044 557 5255 27297 13440 21226 26060 28875 300 8454 396 27979 25998 8734 9820 22370 3875 26358 26384 12591 26114 29610 12183 15722 29971 5804 10489 2548 29277 13097 19843 19372 19804 12467 2412 3711 4225 15202 24051 29399 5140 19293 5563 5975 10604 8722 11230 8796 6205 27377 23788 7237 16738 14133 11767 12239 7354 27329 14432 12580 11872 15339 16324 5281 2272 15919 18405 23238 3644 20037 7221 19740 14881 9948 21458 21721 20274 632 7531 22448 29320 28575 1484 1684 23572 314 17511 10742 23432 6120 1756 13668 831 23308 709 12194 11481 15426 16126 27391 12597 14490 15204 11820 11558 15988 14707 14715 28040 27022 2964 11343 9853 20469 20448 7921 30386 8030 10079 10797 9471 12773 12408 22081 27431 11141 647 5583 4867 19597 9640 21448 7774 22031 978 14982 9318 5329 23331 747 1599 24719 13982 10148 22796 19316 16641 13398 1385 11074 21429 27365 15030 17211 3435 3121 19692 22379 14270 22290 12713 25821 29202 30112 23466 418 19299 5266 19721 19875 4120 27217 3456 12505 29571 29323 1359 29271 18848 23988 3711 27838 30064 9471 15792 13372 25101 28859 3582 24067 921 10735 1252 24500 16866 9523 24035 25043 22577 6407 20445 8841 13840 17428 23024 13023 27418 13669 2039 5284 4272 20790 12124 14854 8589 24186 2542 124 11300 10583 13607 8364 7702 22179 8034 18294 25817 9609 29141 26471 28410 0 28693 25766 12550 25246 15174 21691 27153 3960 7108 15248 8867 8637 7526 25098 25457 9549 4919 29817 17975 29608 12231 5214 13215 7529 3174 28008 29496 12796 3906 11660 28238 4295 24868 28946 3822 14643 7700 8772 4564 25809 28687 16723 12784 545 1026 24533 10526 2781 18949 19829 11457 8993 22179 15321 4961 2623 2304 7882 9519 1755 19477 14008 20611 17807 13434 20328 25809 15475 20333 14032 22015 9478 521 7297 11756 11083 30411 6101 23078 13808 7653 3799 14951 12091 8232 4961 10525 4842 4867 13342 20032 9328 14808 11890 9097 1406 17654 21576 13916 19328 21178 9578 4949 26018 16604 13328 21777 18932 7321 2070 7697 14266 9879 12271 19185 26947 14798 20341 18010 753 12687 20366 16795 22301 4021 24333 15105 8536 13240 28609 17761 5504 518 17937 3329 3001 25432 26541 3002 3436 16197 9838 15328 16775 26537 2795 25184 7045 17243 22843 12232 10984 15198 11963 17345 12186 18466 29254 26266 21216 1565 17729 29158 7355 4837 1356 28911 6749 26024 20177 19405 24682 20539 23639 23171 19707 1278 1465 17435 10327 16584 14678 15700 28585 6210 24813 1477 19918 7305 17774 20937 30288 20203 23788 21655 16483 18985 17501 28765 13494 25663 1925 12695 7109 16881 2053 12382 4765 11370 13410 10697 9692 29500 21773 16350 12204 23752 14420 29567 3862 8483 5243 12830 24323 27405 20033 30085

TABLE 8f (Rate 11/20) (n_(ldpc) = 64800) 20834 22335 21330 11913 6036 15830 11069 10539 4244 15068 7113 2704 16224 2010 5628 27960 11690 22545 24432 4986 21083 17529 4104 11941 21239 9602 689 13248 1777 4876 2537 20869 15718 9575 18164 5294 13914 21711 23374 9675 21239 13600 24710 10613 14804 19412 23270 26741 10503 25258 17816 25210 12518 8680 6422 22715 25097 26959 3913 26493 7797 25977 4896 27063 20781 21715 12850 7963 4027 4295 14931 18158 616 20570 8720 16487 19050 23925 7939 21089 15170 24325 6651 22352 5633 27903 2685 1310 5594 9296 25670 25121 13906 8217 25390 9112 13945 9826 10844 11418 10724 11518 9280 9576 25979 23644 16073 27407 3476 28057 4003 2279 17490 7558 9538 22115 20439 20708 22572 14997 15780 5159 11356 10931 8514 23275 2560 912 15935 20703 26467 17173 21964 15469 21967 10380 16222 15106 16786 19542 28560 18387 27909 14897 6167 24295 1266 16902 9546 11628 12048 24495 3706 22629 14165 2333 19403 18738 28140 13141 6151 22785 9620 4290 2342 4902 15856 19033 22820 15761 1985 9160 4435 11164 5442 23572 6951 19077 15406 16658 18324 19229 16997 10094 19982 22821 7810 19660 1182 21968 16564 17453 10780 17034 16405 11 28611 10411 15799 15705 2773 28601 19333 19447 16790 4618 15841 23854 24686 4131 1013 2141 6052 11896 18719 16813 22420 23406 21052 4333 17754 16425 17614 26883 12101 8224 13979 6869 25215 25991 28968 19337 25361 20513 1671 14990 20692 24951 19446 7163 4959 13197 19201 3883 22532 15468 11856 22758 23586 16985 18396 7434 11817 363 11824 285 20897 16646 16095 17011 25144 14916 6302 20972 25439 6156 21776 19701 27803 9695 12941 23541 27425 6979 27910 7378 8983 6280 4134 28860 8079 20892 28776 7899 23399 87 18045 23929 25876 15560 23629 18376 4053 14655 2450 11907 19535 28543 3513 4704 16512 16554 14062 2596 10357 17316 1011 22090 11353 20300 15300 18536 14293 4746 28831 20028 16742 16835 28405 11245 10802 20242 17737 9590 20693 26547 22557 22517 6285 5336 3998 2351 6628 22949 1517 4712 1770 9207 28522 14116 5455 13105 18709 3030 4217 6306 27448 1943 23866 20212 18857 14794 21425 15659 4446 21140 13454 21115 3271 1443 2153 12424 6159 23559 22473 26065 15914 22980 12766 3482 16233 5719 27020 12322 24014 25438 26499 26506 21987 16027 6832 17330 2620 20756 15985 10471 23302 593 6869 27185 22961 9129 25646 10702 12334 23959 6375 23299 26942 8029 4072 24051 15147 5113 14725 1451 27291 28731 18808 11561 249 28962 21405 18944 6889 3314 23457 27708 14530 8795 6185 28821 6550 2259 17627 701 20819 18831 20140 4991 11369 4282 13230 3413 27092 14556 5068 16209 4337 24652 498 715 28883 2285 16524 25513 26034 21067 15122 21667 27982 15280 3313 7563 22779 22453 4744 17277 27210 19170 10806 18815 26424 26442 7837 26264 28931 6020 4645 20678 13160 18111 28045 23883 5128 10876 3087 28551 26276 3541 20152 10181 28172 26430 14769 6809 4956 16130 11348 1691 10216 5743 7848 20236 2661 10660 8321 6155 2757 6963 2596 27791 6707 258 12785 21176 15450 7477 17274 25201 262 18996 15836 5287 11970 13365 3098 17823 10786 21831 14476 11447 1893 3625 25404 20880 21987 1228 20942 15045 21358 18237 28914 15673 24273 284 9803 13949 15670 16693 15553 27782 22644 27980 24820 27733 7015 20974 10016 26164 20314 25916 11489 13663 11777 18230 11483 5655 1618 19977 26521 25639 13184 28994 3821 18349 13846

TABLE 8g (Rate 26/45) (n_(ldpc) = 64800) 12918 15296 894 10855 350 453 11966 1667 18720 12943 24437 8135 2834 11861 3827 15431 8827 8253 23393 15048 5554 16297 2994 6727 19453 2371 26414 3044 20240 18313 11618 3145 10976 5786 5609 16358 2547 11557 14755 26434 2510 26719 4420 6753 917 7821 26765 11684 9811 5420 6653 19554 11928 20579 17439 19103 21162 11235 19172 22254 3420 10558 3646 11858 24120 10189 8172 5004 26082 4345 5139 15135 26522 6172 17492 8462 4392 4546 27330 21498 13424 8077 10165 9739 482 23749 1515 12788 10464 9085 20875 12009 22276 18401 7541 5871 23053 16979 16300 13566 19424 5293 18290 23917 9613 24175 11374 11736 17676 13126 20931 20290 20659 2000 7969 9386 21507 24494 11822 21771 26776 21175 27354 15815 7598 19809 611 10144 195 14244 7229 13002 14328 17987 14595 6985 7642 9434 7079 5571 10013 3641 14064 11716 4620 18119 23365 26446 26273 25164 11262 26019 15166 19403 5606 20138 1893 645 5414 12097 18635 21648 12255 13269 1895 9969 8372 17737 21679 17061 20219 2513 27199 11242 17025 1261 12845 13086 16256 15177 20822 10862 18375 6751 17532 24725 6966 18489 8373 25550 20688 16686 7894 24599 21578 12516 7115 4836 23473 25162 14375 9150 6606 21633 16224 23708 20350 4575 143 13356 10239 22868 10760 19807 7079 16382 26236 22606 16777 24312 16941 26684 8658 19279 15136 8603 332 2898 21821 23778 3232 12052 14336 7832 5600 27015 14392 26564 21616 8332 21750 10379 19730 7553 27352 2718 15202 25661 6891 13210 15284 21940 8742 10965 3176 25034 25137 25161 13267 7012 4993 9943 13260 20980 20224 20129 2120 23111 16640 23548 21445 10794 4846 2858 22663 12584 20448 4629 17825 22269 11278 26312 9463 21085 24282 18233 9220 14979 24106 14507 24838 19689 17589 7926 7893 21701 12253 26122 8035 20823 2584 4703 25178 5460 4190 7057 1144 8426 12354 7216 19484 4110 22105 1452 11457 12539 27106 14256 14113 20701 2547 26926 25933 11919 12026 24639 19741 15457 9239 26713 22838 6051 8782 14714 23363 450 19972 2622 19473 24182 2391 26205 10018 9202 15690 10472 20263 469 18876 23660 9005 12595 23818 26430 926 6156 5440 5209 14958 9882 18843 22063 12749 18473 22546 11768 4493 12833 18540 3544 9471 15893 14761 23479 22010 15491 19608 25035 9094 24836 15909 16594 23538 25136 25063 24995 5354 905 18580 15476 20710 7774 6088 17133 11498 4721 17594 18267 1645 23638 26645 14800 17920 22016 12927 350 19391 19447 19886 25992 26120 1747 11234 1588 23170 27232 2230 15468 18709 17410 11055 20645 3244 25815 14204 2858 7980 12780 3256 20418 24355 24260 16245 20948 11122 1503 15651 19272 24054 6075 4905 931 18884 23633 17244 6067 5568 26403 490 16113 16055 10524 23013 8138 12876 20699 20123 15435 27272 27296 22638 7658 17259 20553 14914 17891 12137 16323 1085 18895 21503 17141 2915 21979 23246 1271 14409 11303 12604 25591 12157 14704 18739 19265 8140 11244 5962 6647 3589 6029 6489 16416 185 9426 1267 14086 22473 17159 22404 23608 7230 22514 21605 7645 1239 10717 12028 13404 12140 14784 15425 14895 26165 18980 15386 14399 7725 14908 8463 22853 22095 5517 1854 8283 24381 260 12595 839 23743 22445 13473 8017 7716 8697 13050 16975 26656 16911 11972 26173 2504 15216 7493 6461 12840 4464 14912 3745 21461 9734 25841 4659 7599 9984 17519 7389 75 12589 9862 8680 23053 21981 25299 19246 3243 15916 21733 4467 26491 4959 10093 20074 9140 15000 12783 854 10701 25850 13624 7755 10789 3977 15812 10783 5830 6774 10151 21375 25110 5830 15985 18342 2623 4716 27211 18500 18370 12487 7335 4362 21569 16881 10421 15454 13015 5794 1239 9934

TABLE 8h (Rate 28/45) (n_(ldpc) = 64800) 24402 4786 12678 6376 23965 10003 15376 15164 21366 24252 3353 8189 3297 18493 17994 16296 11970 16168 15911 20683 11930 3119 22463 11744 13833 8279 21652 14679 23663 4389 15110 17254 17498 13616 426 18060 598 19615 9494 3987 8014 13361 4131 13185 4176 17725 14717 3414 10033 17879 8079 12107 10852 1375 19459 1450 4123 2111 17490 13209 8048 15285 4422 11667 18290 19621 2067 15982 304 8658 19120 6746 13569 19253 2227 22778 23826 11667 11145 20469 17485 13697 3712 4258 16831 22634 18035 7275 23804 14496 17938 15883 14984 15944 2816 22406 22111 2319 14731 8541 12579 22121 8602 16755 6704 23740 16151 20297 9633 1100 19569 10549 19086 21110 11659 6901 21295 7637 11756 8293 9071 9527 9135 7181 19534 2157 788 13347 17355 17509 711 20116 21217 15801 12175 9604 17521 2127 21103 1346 8921 7976 3363 11036 5152 19173 8086 3571 1955 4146 13309 15934 19132 5510 12935 13966 15399 16179 8206 19233 16702 7127 12185 15420 1383 6222 6384 20549 18914 23658 11189 638 9297 17741 9747 13598 17209 11974 20776 2146 9023 3192 19646 3393 1727 15588 20185 5008 3885 5035 15852 5189 13877 15177 3049 22164 16540 21064 24004 10345 12255 36 24008 8764 13276 13131 2358 24010 16203 21121 21691 8555 11918 129 8860 23600 3042 3949 19554 12319 22514 11709 11874 11656 536 9142 3901 580 1547 10749 5529 3324 6251 1156 112 13086 5373 5119 132 18069 10482 19519 17279 2017 14846 21417 17154 21735 18788 11759 192 16027 6234 20417 3788 15159 22188 21251 16633 13579 8128 1841 23554 15056 12104 9182 6147 1553 12750 4071 6495 4961 18460 23266 10785 10973 4405 2707 7665 7043 1968 3589 15378 9642 21148 13073 13298 20040 13582 17124 348 12055 378 7476 9838 15454 5218 14834 17678 3445 18453 2767 388 12638 5688 56 6360 20009 872 16872 10206 5551 477 10662 23689 19768 8965 17535 4421 19397 18734 5422 10043 22104 21682 508 1588 23853 1092 7288 4358 2283 22298 10504 15022 8592 22291 11844 17038 2983 17404 14541 6446 20724 7498 2993 14715 9410 6844 20213 14674 263 4822 20951 635 20651 23174 5057 22237 9229 4859 17280 9586 20334 19508 8068 11375 5776 21209 9418 6872 6349 20397 11165 19619 13108 13550 10715 5122 5655 10699 8415 9864 4985 7986 6436 3754 7690 4257 17119 5328 659 4687 6006 527 10824 8234 11291 1735 22513 7254 2617 1493 3015 7462 10953 15705 2181 11992 4628 19430 18223 9426 21808 13549 17008 3470 22568 13643 24195 21816 936 14226 22874 6156 19306 18215 23984 14714 12907 5139 18639 15609 11908 5446 8958 6315 16864 15814 10686 22570 16196 203 4208 13716 494 14172 11778 15112 14244 8417 21087 4602 15570 19758 4401 22270 8218 11940 5009 23833 13785 12569 1698 7113 18541 18711 19991 19673 8025 17107 14784 5954 6817 19810 24143 12236 18063 23748 23956 10369 7805 13982 13861 5198 10889 6787 10406 13918 3305 12219 6523 12999 9964 2004 17361 23759 21507 11984 4188 19754 13358 8027 3662 2411 19762 16017 9125 2393 4619 5452 24176 6586 10895 15872 1795 15801 6911 15300 14787 2584 4905 8833 1327 12862 9476 16768 12633 7400 11983 6276 18370 12939 12793 20048 20284 12949 21345 19545 4503 16017 1253 12068 18813

TABLE 8i (Rate 23/36) (n_(ldpc) = 64800) 2475 3722 16456 6081 4483 19474 20555 10558 4351 4052 20066 1547 5612 22269 11685 23297 19891 18996 21694 7927 19412 15951 288 15139 7767 3059 1455 12056 12721 7938 19334 3233 5711 6664 7486 17133 2931 20176 20158 9634 20002 13129 10015 13595 218 22642 9357 11999 22898 4446 8059 1913 22365 10039 15203 10305 22970 7928 16564 8402 9988 7039 10195 22389 5451 8731 19073 1005 18826 11109 13748 11891 21530 15924 21128 6841 11064 3240 11632 18386 22456 3963 14719 4244 4599 8098 7599 12862 5666 11543 9276 19923 19171 19591 6005 8623 22777 1255 20078 17064 13244 323 11349 6637 8611 6695 4750 20985 18144 5584 20309 6210 16745 10959 14284 2893 20916 10985 9664 9065 11703 17833 21598 22375 12890 10779 11241 13115 9222 21139 1217 15337 15514 12517 18953 11458 17296 8751 7213 12078 4994 4391 14976 3842 21548 10955 11679 16551 8514 17999 20557 16497 12122 23056 10551 20186 66 11038 22049 2130 1089 22093 9069 3470 8079 19208 22044 2732 1325 22309 967 22951 1366 11745 5556 6926 2805 18271 10046 4277 207 19518 17387 9701 8515 6813 10532 19714 21923 13493 1768 18819 6093 14086 13695 12781 9782 445 22160 15778 13629 10312 19769 8567 22096 15558 19730 11861 18492 10729 16847 273 4119 4392 11480 20396 3505 7220 390 5546 17277 8531 17390 22364 7167 2217 7325 3832 19899 21104 8400 3906 6218 20330 14943 14477 5614 1582 21534 14286 14624 14809 6775 22838 15786 6527 15848 5288 13523 9692 12696 15315 602 17081 6828 13578 3492 6510 20337 6113 5090 7290 20122 15539 19267 10412 19090 17863 2546 2295 19448 20296 2296 2627 6740 14224 10460 12878 6055 15452 15152 15699 563 15414 21900 19161 11126 15975 3733 4379 15742 6475 17203 5870 18537 4912 260 21115 23164 4273 1694 1082 5287 11152 14537 2277 19232 13414 15608 12926 17043 18241 18313 208 6118 20777 9140 19241 22845 18527 5035 4161 20867 22650 5585 7875 10358 1898 3563 14833 21329 14705 3359 13959 4507 11976 20017 22424 12925 8308 8739 15561 8010 6408 20723 20928 12337 7864 15777 12742 20430 17351 6259 1865 9808 8343 17441 2551 2167 3025 23181 22718 13243 4797 4223 4982 4395 1609 16748 17625 8463 15204 19632 6583 9112 20284 11334 19370 4763 746 18560 15222 8796 12725 15176 10245 15567 9991 17447 18373 21523 1473 5286 15793 17675 21170 6699 15515 15942 8733 7047 11348 14584 20435 19603 1961 18851 7069 11402 19180 6487 2979 2650 13282 9040 22613 23266 4786 20832 3001 23129 3850 5255 6601 19827 15438 13956 15798 4430 11318 4724 8719 21209 18127 844 21379 7427 22987 10233 22949 8145 21778 7622 14471 18874 8566 14340 3381 3373 419 11514 15127 917 13136 19375 18740 4951 960 2856 17804 662 8107 10298 10993 11755 19142 11400 18818 521 7210 18658 8285 9496 20836 5655 14654 13694 12705 20381 16473 7271 12796 3280 23370 13893 7667 1736 5485 18321 7789 11242 18771 17282 817 21060 15985 666 20461 22464 7696 19774 4324 12239 14014 4759 5011 10472 4137 3047 2444 3818 1594 20382 538 7051 21874 1697 18539 26 21487

TABLE 8j (Rate 25/36) (n_(ldpc) = 64800) 11863 9493 4143 12695 8706 170 4967 798 9856 6015 5125 12288 19567 18233 15430 1671 3787 10133 15709 7883 14260 17039 2066 12269 14620 7577 11525 19519 6181 3850 8893 272 12473 8857 12404 1136 19464 15113 12598 12147 4987 13843 12152 13241 1354 12339 4308 23 12677 11533 3187 11609 4740 14630 19630 14508 10946 3928 580 3526 17836 3786 15739 13991 1238 1071 6977 13222 13811 585 8154 2579 8314 12185 15876 7738 5691 12901 12576 11597 4893 17238 15556 8106 12472 10455 14530 17432 8373 12875 16582 14611 14267 15093 2405 9342 18326 12125 9257 5861 12284 2441 13280 2762 5076 17758 4359 6156 18961 13208 4400 8474 19629 19528 14125 12780 12740 19316 491 4761 1719 7270 6615 1175 15848 6943 18360 8905 13921 10807 19688 18757 8312 12234 17907 17254 7699 18399 5508 12215 4818 18107 2874 19496 13973 10432 13445 15320 13648 1501 10549 6710 8897 1998 1575 12713 10916 5316 13713 11318 4055 5782 5828 17981 3141 12177 10726 4244 3138 15996 6822 7495 5257 8909 6180 10680 6650 1909 19146 1038 17229 10050 3051 9793 10839 3532 14759 5337 8448 4939 14792 7585 17860 8612 2229 18965 1519 2031 13845 9320 579 15441 15050 752 8303 6989 13360 12927 15255 17286 3639 1733 16883 8457 9475 2939 3234 1993 8554 9939 6359 15474 12100 6992 13844 16988 7481 16977 9052 9262 15270 7181 3624 3814 16379 182 4338 17627 3315 5745 14093 15574 10709 18662 6909 11248 5268 412 5854 16782 16059 10498 5061 13321 617 6734 3718 15441 19241 17214 1682 18641 18646 6330 7377 16951 14477 6507 9922 11464 2563 5702 12691 10606 17874 7198 12571 17617 4862 18899 7100 8130 9665 10779 6789 11459 17651 3693 13332 3854 7737 12589 15189 16260 14569 9442 17890 18097 6845 6960 1376 8099 12719 14986 18999 14013 3449 13618 14807 265 1508 11231 966 15957 8315 3384 2570 5700 10911 17372 153 8445 19598 7841 14806 54 2492 14099 11718 18608 4278 333 59 3982 16986 3494 12496 2775 18320 10650 16234 9739 16537 19706 7587 19072 18775 14133 12042 2922 229 17958 15889 5130 11029 271 5122 7021 7067 12258 16611 9245 15493 15347 15939 741 12055 2822 12804 3480 5690 18598 19273 16354 2569 16771 13693 15051 853 956 12256 2756 15137 15685 2802 16479 14687 12470 3583 15473 17781 867 4843 6765 13122 11287 3680 19101 4609 11385 13470 12353 6632 206 10984 3116 1263 9419 14455 19438 9528 1808 435 2238 12870 10119 10868 8402 11111 11081 7197 2667 13780 10759 19722 3768 3052 1836 446 1642 12388 16876 8398 14485 7301 14815 13811 5678 10419 14396 1877 14384 12817 19028 19589 6893 8725 6346 676 13611 12486 2054 11203 14908 14692 18139 5334 1253 16233 9749 16946 18885 4332 16306 3862 10395 13871 3747 8900 3381 13367 14132 7220 15095 4219 15869 13519 18079 17541 19012 13943 19471 2221 5710 13711 5185 3363 10195 9580 17331 15360 14387 7596 9614 17336 6371 6030 14629 10636 10159 2402 9170 4321 1040 5899 153 7710 7637 13966 10919 8535 3791 1968 2567 4986 4166 8744 17691 540 10695 10019 17710 1188 10821 5858 17012 17389 3083 17587 12682 5354 9537 6807 4964 15942 9653 9000 17053 13291 11685 8503 10777 13919 18155 9877 1625 15314 13879 18520 7074 17061 3748 2752 7298 493 19163 14139 2260 18339 10688 8928 17695 10276 7640 18547 3561 11275 5297 13167 19691 19542 15725 11837 7273 11297 17873 7840 19563 8109 3811 18417 17759 17623 13175 10041 4152 2249 18452 1450 19309 9161 11651 4614 11547 14058 639 9384 3272 12368 5898 2578 14635 15963 6733 11048

TABLE 8k (Rate 13/18) (n_(ldpc) = 64800) 2510 12817 11890 13009 5343 1775 10496 13302 13348 17880 6766 16330 2412 7944 2483 7602 12482 6942 3070 9231 16410 1766 1240 10046 12091 14475 7003 202 7733 11237 15562 4695 13931 17100 11102 770 3848 4216 7132 10929 16469 17153 8177 8723 12861 15948 2251 1500 11526 8590 14813 3505 12654 1079 11736 6290 2299 17073 6330 5997 390 16492 13989 1320 14600 7061 6583 458 894 1596 8625 7644 1322 16647 15763 10439 8740 5529 2969 13893 13425 13121 5344 8739 4953 7654 17848 9334 9533 2731 12506 10992 8762 5395 6424 11688 3193 17601 14679 8204 5466 15487 1642 6671 13557 4074 7182 4436 12398 12973 1958 13041 6579 15984 3762 16633 6113 11509 7227 28 17202 4813 14024 15099 2648 4476 2260 6507 9930 9232 14186 14510 6818 7665 12708 2645 16687 13255 8239 15884 1751 7847 17987 11410 3345 17133 17655 5027 1261 17191 8056 4264 13915 8217 6118 8072 6278 6835 5038 15008 13625 2999 5336 11687 13500 5723 13903 766 6293 155 12316 14093 7372 16846 15357 9865 17869 1429 16681 202 15062 1123 6454 17625 3213 39 1669 1770 13636 16555 13053 7597 11481 1336 3343 11387 5463 17830 13741 5976 1956 13509 1664 16867 8168 13421 17078 3285 17138 1572 16711 1499 4805 13584 14759 2844 13110 7356 5850 8330 6521 8528 14170 6681 16992 12867 14326 15227 4082 8595 16176 8184 8572 1923 935 8900 13020 6812 9778 3391 3946 4711 15314 15108 15634 4144 4372 9207 10715 1291 16601 5864 10968 4724 9235 6988 3307 6515 7004 16328 16217 4227 9735 15857 5003 2532 4451 8574 2149 6908 9506 8949 12035 9701 3124 14295 8567 13614 5159 16746 2418 8669 10921 5738 147 1004 2692 9065 12877 7559 16706 8511 10314 3118 1219 7071 12376 538 2389 3297 12492 10589 5791 13528 1653 6618 10485 1307 4102 347 13580 4039 523 10311 10540 4183 6192 17159 11458 6521 9632 11594 15791 10384 11654 126 11715 6265 34 5091 7271 13900 7588 3960 11297 1612 9857 4695 16399 6423 2197 15040 4219 5979 13959 2959 578 8404 4585 658 6474 15900 11357 5249 7414 8642 1151 4130 9064 14537 14517 1356 3748 13865 12085 17295 9530 5110 1570 10862 8458 15322 16355 1774 5270 1229 11587 1632 17039 787 4703 11423 15388 6136 8413 9703 13946 4678 4072 16702 6244 4690 7164 7238 14169 5398 8679 122 11593 10954 15802 16427 9413 6717 16406 1027 17863 7836 655 8827 10286 4124 12599 12482 12955 3121 15318 8343 16634 6301 13568 5056 9920 1948 10 17395 8550 131 2151 15226 15994 13093 10966 15412 2781 13425 15831 5346 2261 1067 6346 6625 1966 13533 10575 4483 5761 14366 2019 14426 16746 1450 4830 13109 7358 7942 15376 7284 14035 14341 12625 3306 9375 7529 1537 13831 13447 4549 15658 15299 8238 4005 13264 9766 4715 6285 15383 1262 12883 15434 11123 14975 3434 5307 1112 16967 12163 12009 3681 9174 13153 10344 13456 13197 9562 1785 7549 15347 663 9748 9436 4961 11903 11574 16248 6238 666 11426 13748 14763 14431 1443 2069 2376 8154 14978 13140 1289 9046 1159 300 3319 11510 7769 15877 6430 14946 6856 8868 15622 12458 4867 6622 6850 14721 11241 12760 14233 9874 17682 16677 13195 15086 11155 7067 14160 12741 14379 8922 1930 17055 11752 12361 6523 9568 12165 5636 16011 11389 4754 9916 15903 15542 8301 12073 4918 9754 16544 17907 14814 10839 1401 5107 12320 1095 8592 15088 6521 12015 14802 3901 8920 17932 2990 1643 5102 3870 2045 540 2643 2287 5844 2482 9471 10428 637 3629 8814 7277 2678

TABLE 8l (Rate 7/9) (n_(ldpc) = 64800) 13057 12620 2789 3553 6763 8329 3333 7822 10490 13943 4101 2556 658 11386 2242 7249 5935 2148 5291 11992 3222 2957 6454 3343 93 1205 12706 11406 9017 7834 5358 13700 14295 4152 6287 4249 6958 2768 8087 1759 11889 4474 3925 4004 14392 8923 6962 4822 6719 5436 1905 10228 5059 4892 12448 26 12891 10607 12210 10424 8368 10667 9045 7694 13097 3555 4831 411 8539 6527 12753 11530 4960 6647 13969 3556 9997 7898 2134 9931 3749 4305 11242 10410 9125 9075 9916 12370 8720 6056 8128 5425 979 3421 5660 9473 4348 11979 5985 395 11255 13878 7797 4962 13519 13323 7596 5520 2852 8519 3022 9432 3564 9467 8569 12235 11837 5031 4246 2 4081 3630 1619 2525 3773 11491 14076 9834 3618 2008 4694 6948 7684 9642 5970 1679 13207 12368 262 7401 11471 2861 5620 4754 7474 10418 1422 10960 13852 988 13465 6415 86 2432 7595 12239 8539 11749 8794 6350 1947 13325 13061 7385 13017 2536 13121 15 7944 13831 5126 9938 11758 335 980 9736 12143 5753 4533 10814 10706 12618 6949 2684 4107 14388 11372 6321 13832 9190 2838 13860 10830 1947 13803 3257 2677 406 8400 10536 12911 3629 251 9784 13343 13304 301 801 6456 6351 6155 6763 3812 11337 8446 9306 524 5573 503 10544 8990 673 2309 12376 466 11441 960 1557 4403 3564 1732 13453 12054 8941 1383 12424 4347 9830 3553 5158 2025 4282 4983 13553 10776 11833 13099 5078 4420 3527 1544 7474 2780 7749 4153 11189 520 8463 12230 7712 10409 13367 2604 2966 9248 1412 420 3507 9818 7955 1122 12483 9375 10232 9456 2799 7033 10404 4495 12059 2569 5970 6262 2199 8045 11724 511 12693 12855 9597 756 12900 13391 13623 10683 2095 13479 1488 9469 11142 13849 1356 10776 3530 9866 13449 14225 2072 12772 9461 6466 6181 6502 401 7439 4631 1086 3062 11789 11811 6788 14007 2270 14132 2764 4643 10272 11316 2608 8511 5221 9028 2736 7223 1051 1974 2737 6739 13904 6156 5 9082 3915 2400 7195 3413 606 221 8171 4548 1267 5310 12795 2160 8305 10563 3507 12190 6325 2499 9717 9251 6046 13308 11704 10834 11241 4777 3774 11533 12487 10365 6852 58 2650 2027 7248 13704 5573 12777 7834 8561 7906 8121 7774 554 3105 6000 11198 3586 10410 9002 4094 11297 12058 1037 13638 1258 12917 11078 2430 51 10276 7841 9451 10236 11045 1058 10352 9629 9428 86 8146 1255 3802 10820 6337 4199 9364 7723 1139 438 6445 583 2683 5358 10730 8471 3061 13380 3005 2840 4754 8210 1814 11502 8667 14258 5985 8407 13336 10970 6363 11715 5053 104 13618 13817 6562 4087 294 1742 10528 4626 6607 2692 1587 11097 8361 2788 13451 3541 823 4060 13604 9816 157 6106 1062 8853 5159 4270 9352 13164 2919 7526 5174 12501 12634 13077 5129 5750 1568 6281 269 5985 10973 8518 9415 1028 4722 13275 634 12113 7104 7436 12787 1032 5936 3425 11526 10797 784 9208 15 11223 12849 4913 10635 3553 8852 11749 10619 3532 4080 9831 9219 6560 6049 6111 1304 11770 12585 13209 8589 11287 2887 10699 14307 4752 456 4073 1175 13156 4894 12756 3237 6279 10125 7074 2344 7533 7103 5226 4000 4425 12173 10056 5312 1599 7445 8696 12533 11509 14050 2483 12405 2876 5033 4512 4955 5627 5572 5099 10987 10665 404 3082 2075 1583 13454 5666 7228 524 13290 7634 418 9006 7368 4181 9447 3674 8171 9355 10211 9342 12572 3681 3322 3295 186 7491 7926 212 5241 5479 1654 8097 5078 423 4817 1357 12780 3664 11900 402 13108 299 7166 12008 5750 3041 5618 8357 1229 8884 3713 8791 13375 4390 6302 568 1009 4440 10003 1209 11978 11711 1803 9838 13537 11318 9750 12421 2388 3021 7880 7220 1062 6871

TABLE 8m (Rate 31/36) (n_(ldpc) = 64800) 8971 1759 4661 2344 8810 3677 5653 5575 7855 8916 1232 6045 3232 8535 7071 6764 5731 2016 8662 3813 223 4080 3502 3358 2640 7181 793 289 4907 6380 6437 261 7395 3264 6823 551 107 3672 245 2133 2328 2462 2349 1096 4755 5134 5661 5948 3017 7071 6140 2620 4479 5669 508 5209 2522 3677 7033 4553 4780 8149 6346 4190 5242 3118 8430 2284 8323 3944 7479 7765 7974 3145 4381 47 3257 584 8668 3622 7087 6946 4527 5274 6111 4151 1805 3370 3713 3710 186 758 1606 8866 2975 3305 6548 2039 2197 4021 661 7382 3627 628 8334 4880 2742 5139 1910 5450 6338 8246 8710 8382 2952 3468 4905 3623 6578 2519 8966 1781 4964 623 4641 7520 6371 6835 1853 8584 3351 7486 7368 1500 5916 5328 2390 7684 8660 4286 7833 8517 3696 8199 4143 538 3959 8390 3414 8353 5244 5698 1645 3804 2158 1979 10 8920 6848 434 4640 3443 4662 3311 8682 4678 5773 8736 4743 7365 213 3257 1449 7394 7035 356 7916 2503 7790 8719 7879 4639 4251 1160 542 8333 3163 713 304 1515 3019 5747 7901 581 857 7416 6967 4325 1224 8200 817 7526 3694 1563 5341 4464 1668 4154 2731 5150 3051 3027 4312 8372 8168 2438 6549 1669 2508 792 5112 6776 1508 8775 1199 2766 456 4827 7450 6774 4851 6529 3650 1777 4738 4717 6245 427 5897 956 7912 829 3876 5237 7972 6664 7929 8937 8392 7322 6575 7176 1446 4850 5066 8804 8899 8400 3469 6998 3642 3011 7923 4486 1765 6452 3059 5714 788 2207 3170 7267 1301 4997 4439 5972 2812 1780 6970 1589 7959 8278 6071 4534 3352 97 8471 2786 2155 2310 981 4507 7595 8390 1576 903 4985 906 4329 6038 3816 6655 3181 8643 462 6342 369 7927 5468 4640 5158 5099 8728 1162 1013 1668 4991 10 4023 7683 2169 5932 4904 1508 8599 81 7255 1696 4953 2574 3819 8670 4354 5201 3245 8547 2582 8283 5948 112 0 3555 8320 7361 3833 6990 2073 8147 3267 443 5558 422 4028 6204 3714 3204 1319 5834 385 2462 1221 7359 5931 8590 8507 6028 1036 6649 411 8848 2741 8385 2 734 5600 5141 6463 8874 5635 7438 4542 4355 8441 7926 3737 106 6421 5843 4827 1068 8169 4377 6957 13 3539 1226 175 8814 7140 3442 5985 8721 8564 6126 3850 8168 7291 8950 3881 1495 7555 8118 5993 6269 2364 6839 185 4721 8226 3508 5415 7558 6282 5985 8472 2791 4386 6780 6798 2965 6375 8983 3049 7644 5774 6057 8856 1119 6354 8565 6181 1611 8078 3236 6834 5834 2671 1352 3780 2609 3762 2341 1778 6913 523 2420 1779 6462 8692 4898 3367 3526 2137 1829 1013 953 6042 4363 347 7052 5170 5807 5302 2622 4624 8309 4278 3905 7431 3576 391 6 2284 6866 624 7584 7746 3739 5085 2171 7148 1787 5217 7011 3901 8124 6487 2318 1527 8208 889 7568 4516 1340 1403 7681 680 8128 3502 8037 5595 6254 6343 455 3114 8126 6908 1370 3185 1047 4035 8017 2815 7533 1663 2346 4345 238 3292 527 7323 8811 7598 2211 5857 949 554 7169 8797 1600 869 1269 3815 4457 4850 3857 3079 4500 4413 7547 2532 250 46 3357 7128 442 1828 1156 566 7441 603 6927 7801 2986 3767 1008 5843 4822 979 1910 262 7958 721 2898 3835 1141 3693 1448 4271 394 4379 4286 422 2275 2026 4383 4840 7098 8809 742 129 7220 550 7440 6138 4257 7627 3234 8724 7147 631 2669 680 3924 6213 3684 935 2781 3219 8705 4977 2276 6690 8586 4945 8664 7205 5893 7264 6887 1064 6249 3962 7938 4495

TABLE 8n (Rate 2/9) (n_(ldpc) = 16200) 1412 2138 8984 3438 2515 10585 11093 5801 2511 2287 10879 10470 10973 3691 11847 4141 479 7406 3228 8356 256 11769 2480 8892 9040 4517 2672 11159 7865 6415 2638 5399 7575 952 3128 12126 6408 60 10782 10254 11866 4473 10592 8736 3819 669 2091 5790 5040 6987 1353 2734 9859 3974 12568 5396 3717 6005 5830 9748 7221 8759 396 2259 11357 5702 7043 1281 6308 11899 7792 6476 3741 11099 6895 3224 1940 8224 8533 607 5065 9226 7677 389 7233 11605 7002 1302 10984 3435 9186 5964 7806 1613 11451 6020 5275 4965 6307 6942 1054 2451 5545 10447 6453 6583 6177 6284 11747 11323 2696 5058 3217 6755 1434 3691 8784 11507 1298 1233 7964 8103 6761 11865 1288 4258 7960 6753 4896 3722 3526 6795 4663 2198 9374 8700 9195 9272 7573 6956 3057 10801 574 9292 525 989 7701 3754 1110 330 3367 10472 6202 2627 1181 11223 3564 1628 8362 6419 7476 10074 1406 12509 9757 10380 9841 100 10177 8331 6788 8872 11167 2167 3646 2770 3111 8679 9590 9338 9119 8373 90 10418 12041 7718 3102 8551 6068 8424 10522 8595 6512 866 4591 3390 7496 172 1467 9023 9000 4113 9407 7168 29 11625 8584 8396 9683 1457 6097 9254 1850 12476 11664 11115 4278 11945 844 9302 7661 12225 1040 3671 5318 4875 3554 10478 10902 11739 3429 7114 5533 3709 689 2951 10126 10677 8709 9880 1112 681 6786 2945 8823 210 689 6648 509 2228 11109 10495 8746 8223 4337 6804 371 5245 7435 8110 6001 11003 5097 2116 3826 2054 5220 7231 3029 5134 8970 132 9603 1538 10743 262 11188 990 6782 3283

TABLE 8o (Rate 13/45) (n_(ldpc) = 16200) 7200 3499 6246 3905 247 2945 6706 2366 4892 5254 3370 7202 8203 6971 5728 4002 9544 5247 5176 5021 6732 8016 5317 9111 11144 7046 7808 8792 9779 11402 10050 7970 2047 6746 746 11319 4085 9903 3751 10712 6662 10504 7149 8084 7417 4334 9448 10678 9739 3412 2152 1114 6077 1021 10761 5073 3458 10115 4722 2581 8860 1515 1997 8926 471 2708 1449 158 4140 10611 10740 9693 3165 10132 4839 4204 10917 2320 6112 867 4929 9201 1707 10355 10887 7531 1123 8118 8896 5168 2011 110 9188 8375 9421 1693 1252 5132 10342 3726 2094 761 7397 10962 1848 4584 7139 1858 10499 3638 4924 1466 4191 2999 7778 11389 1071 2537 9265 5340 11498 4140 6795 3575 7332 10491 1502 3493 2380 3962 5169 2719 6028 10291 3440 7669 10253 8175 9134 2374 10199 2229 1055 5597 6655 7533 1518 11299 3033 1083 2464 10032 10910 3439 11511 3763 1424 9362 3170 10113 5492 11354 3160 10592 10897 37 334 8974 8540 9590 4255 5342 6469 11153 2925 3384 8958 7809 8108 2721 388 280 3829 8071 7567 10280 8151 22 8789 256 6937 5050 10795 1844 7999 1047 8549 4046 1696 893 8952 9610 10014 6772 485 9159 11346 10133 4447 10089 9419 7756 2637 6446 11400 9357 9302 2726 1559 7231 9930 9385 7889 2356 11066 14 1180 8283 458 5862 5540 3284 7878 9379 4637 11123 7791 8965 10476 2620 2593 4749 1747 4818 10173 596 9833 4518 5205 2808 592 228 10538 5907 164 2111 6334 1930 7625 11378 1531 3798 8978 4224 10183 8729 2755 10694 4801 2302 2649 1977 10031 3495 4789 1102 760 9858 700 3625 8633 3152 6230 9510 6123 2053 10767 50 1777 10548 6803 3935 1861 220 3117 211 7402 7164 5909 10691 4175 4997 7823 830 6156 5451 11467 1346 2838 5962 2858 10343 905 3219 1146 584 10896 5474 5315 3529 5378 4164 3155 9405 11386 10011 9288 7404 1200 8828 649 9557 9284 11419 7104 6268 918 3637 11395 5539 4612 4850 1965 8574 7497 8644 857 2038 10674 10465 886 10864 7119 353 9657 3090 7792 408 26 5892 4193 3663 10393 11181 5241 2721 10010 3240 7704 9370 8872 9280

TABLE 8p (Rate 11/20) (n_(ldpc) = 16200) 4692 1824 629 6885 466 5885 1190 3308 7241 3690 4845 4383 7107 5761 3200 4648 2401 6747 4908 1777 796 6724 1310 2462 3313 5669 6966 7054 6004 4230 1509 1194 4523 4356 1438 7261 5516 3549 4934 4308 7052 3603 6516 945 3511 617 5820 4168 5622 4545 1242 4382 1781 3490 4461 2464 6762 4082 2975 6166 894 1316 5228 5057 4644 5319 784 7037 3831 3570 853 1703 5064 1011 1642 6895 863 4176 1115 5811 4326 4263 2325 2685 223 6496 669 571 5057 1096 3594 7208 3140 3336 992 3516 4296 4492 5796 1875 3068 4970 6802 2652 214 6831 3611 2470 846 640 2983 2208 5295 5924 5242 5747 3017 1208 974 4819 2163 1631 1198 4570 2983 3664 2253 6131 4672 4698 3272 3537 4532 346 4936 5696 1275 6386 2124 7138 1179 4236 5891 3688 3376 6079 2437 4585 6404 1101 2289 378 6773 2800 2195 5013 3121 6579 5086 4192 3925 6844 4327 6329 6075 2738 6941 4088 4631 5613 2332 1432 5655 2516 5657 5383 3494 1235 3237 3282 449 1982 4339 6071 3262 5233 7004 390 2526 4128 3762 1284 4669 5897 6506 5840 2240 5046 1769 2539 6637 5000 4013 2325 1798 4680 6318 6746 5262 215 6980 2436 6086 1764 4227 4273 3163 2663 2406 2037 2549 649 4346 2391 420 3069 4930 6338 1834 6713 7013 1483 1918 2122 4147 1365 240 6277 6965 2436 2263 1334 2766 3525 5125 5808 4540 270 479 6244 2162 1409 7159 621 1439 4703 6526 6147 2701 7284 5510 558 3472 4520 7268 6903 4942 2301 4603 3451 512 3982 1219 30 2433 3797 469 4999 1845 6340 2327 1127 4663 6218 2112 4826 4851 1442 312 4788 5715 2449 2205 5056 1293 3985 1505 5768 5534 2604 6887 1831 1693 3557 5558 4425 3317 908 6236 5087 2257 3043 7159 3988 4837 4823 2208 908 6145 7232 1654 5099 5820 154 5058 3816 5710 5209 4080 5824 3820 7136 7066 6226 4999 4818 3081 1008 2378 3443 4210 525 3330 6183 1159 5073 5340 5786 3287 325 590 4048 4667 2821 4634 4645 2287 6592 580 4814 4375 4460 1799 160 2686 372 2129 5124 2066 1088 5047 995 226 5085 6263 2380 6679 3460 3011 3728 368 2642 365 3253 3801 2032 824 3243 4488 7088 6069 1002 1830 5718 3944 5213 7126 4207 5638 5780 1663 1081 1969 7238 1671 188 6826 499 5878 4110 393 2845 3816 3302 3755 2810 3055 5876 4890 3663 4288 2134 2926 2633 964 5454 2540 4811 2737 7149 2494 3042 7140 3546 376 4567 5871 4351 797 4245 7178 6811 6722 1351 5102 7241 6537 6828 1345 266 3094 2749 3658 5328 2573 1454 6444 5267 4847 1407 1305 6597 665 860 1934 6150 4115 3799 4362 4407 6956 6703 1355 2152 943 3688 6536 1737 1856 3374 6987 2896 3414 4897 1339 3530 6599 2011 6911 4907 4542 3723 4374 1444 3344 568 4887 4732 6402 1609 4422 2809 2306 570 3063 4645 2697 5994 505 5805 1353 74 6648 1738 725 4900 1614 5497 841 649 731 3474 4246 1530 6986 2023 4976 259 6173 987 5313 2276 3770 4029 5101 4900 3767 6863 3991 2090 6639 1708 6603 328 1674 1476 3494 1497 3083 5233 4103 6677 2522 6812 6404 25 1986 409 2739 1882 3534 1958 861 7072 1958 2364 5609

TABLE 8q (Rate 23/36) (n_(ldpc) = 16200) 4626 1140 3468 5725 2133 2303 473 1009 822 4351 2620 4725 4712 5060 4753 2897 5002 147 236 1234 4181 103 3305 947 2893 3155 3944 5064 1931 2538 3341 4027 4268 5630 671 2963 4446 1161 4388 5381 4986 5105 5817 4928 4420 3543 3452 5455 4711 3255 1654 2549 2963 1256 2235 1127 171 2482 1282 75 1645 2833 5326 2386 4508 4547 3789 1497 5124 2650 2370 4577 1421 962 2986 1788 4993 5240 1659 1071 980 4674 2477 5373 5719 1828 3904 5050 2516 58 4982 5550 5600 3411 1568 3674 2916 4767 5114 3143 4289 2589 1305 4489 1050 5696 1860 2030 4584 1514 4425 3025 5051 5435 5675 2726 81 5031 193 4032 3282 228 392 4389 2396 5698 5563 4218 1740 4605 714 5520 3616 5534 1115 2065 1267 128 2019 5820 791 4558 5700 4883 2655 2903 2269 4669 367 3392 3845 1937 581 928 713 4773 2637 1195 2941 3974 2614 2251 2311 3724 357 5847 1614 543 1039 4426 2821 3108 2323 224 4424 622 4731 2476 5740 1002 5065 4869 1384 50 5035 825 1302 2500 214 5711 4191 4268 5218 3679 1327 4629 921 1368 2672 429 4639 1916 4278 3126 3440 50 3976 5237 4865 2990 911 1768 4500 992 4704 5171 1737 4858 244 5647 4413 3838 930 1764 1832 4028 4958 4098 1522 1326 701 432 63 5603 3397 4963 3719 1757 545 3634 2417 51 476 3169 1744 2751 3068 2754 5788 435 502 3431 5141 217 5343 2096 1154 5301 5455 1306 5538 1821 3787 3714 805 967 4366 40 5228 624 3319 4013 4113 2110 1412 4137 2376 5135 3884 4890 512 5327 5807 2441 3652 5512 3623 1827 1019 1357 2629 2039 4047 4608 152 1129 634 4708 5165 4941 3432 1682 2583 437 4956 989 3149 2444 5476 5063 3147 93 2652 2694 3510 3484 5215 3576 5330 1214 1301 4752 2544 665 1669 3425 3851 917 1677 1696 4385 3184 5716 2684 416 1587 5466 5117 807 402 1819 684 2619 1271 5820 1818 1010 3901 2373 3739 4706 823 3718 3738 565 5476 4945 1396 4745 4776 2784 1079 918 677 3991 5626 3195 2401 1007 3257 1378 5770 2213 4972 2611 2515 4883 4015 4442 3965 5844 448 4852 2035 3579 1090 4495 2482 3385 2415 5603 3036 2307 2416 4994 4832 4212 380 38 2773 2057 1308 436 2291 924 3045 3575 3084 4507 4803 3768 1673 118 4804 3762 2931 4736 5619 1357 2531 3547 1153 343 2676 3784 1810 4515 2576 348 1551 2939 4088 834 5396 1260 3465 1734 803 907 2471 257 1523 1632 3775 2968 5100 166 4352 962 1869 5173 47 4415 5040 782 2449 1611 2239 4649 1664 4422 4211 4708 5777 5762 2579 4418 609 3241 5088 3031 4033 5306 3404 2633 3330 4899 3679 2287 584 5181 4162 3310 1783 2487 2229 334 5507 508 5296 5348 4143 1902 4200 3938 2790 5150 5834 4250 4392 5223 5221 1662 2779 170 2942 116 2334 134 4175 1970 1114 4668 2250 3336 393 1764 3709 5156 3925

TABLE 8r (Rate 25/36) (n_(ldpc) = 16200) 3717 2086 2490 983 835 4687 4347 4476 3404 1761 576 4145 578 368 2845 3005 909 364 3235 3961 4076 512 936 592 765 2964 746 1927 4924 2903 3317 3261 1270 4535 4082 4236 1298 2632 3931 2365 4093 4275 1695 2374 428 2881 2308 1623 277 3560 3583 2093 2563 3756 2174 186 101 1014 1629496 1763 2714 3520 1193 243 2712 2503 1332 1039 3201 3305 4587 3408 433 267 4567 3310 3949 1938 280 3951 4404 4528 4292 2791 2944 1533 1437 274 1965 2557 4701 2488 858 3540 2134 342 4890 2891 1947 1353 2021 1422 388 3045 605 2847 4059 1204 3680 1505 2758 3764 1874 2296 4804 337 2581 1810 2235 3623 3387 484 262 177 3981 2578 3711 215 4569 3281 572 949 2395 1082 1689 2912 45 2900 4391 1219 3966 3939 1521 3156 557 2258 1247 4471 1347 349 1683 4762 2854 1469 1924 3164 1079 1270 4828 2363 2104 1792 22 3231 2775 2423 3177 2287 2571 2530 3480 374 4526 4713 4760 3606 1798 2371 2510 4392 2655 3731 635 1264 4808 586 1530 3539 4714 4507 3826 4767 4887 750 3153 2851 2381 3547 3114 4280 4442 4710 4773 3920 4356 2976 1155 1394 9 2545 879 4188 4150 69 1372 3483 1347 2676 698 2922 2547 4926 391 2998 2896 3684 92 470 884 3186 3751 999 2259 575 4155 2053 337 353 3449 65 2292 726 4700 4012 3049 3508 1443 2438 132 3100 4427 2810 2208 3640 1993 4029 3104 3956 3298 1291 9 2926 39 1053 3365 1223 344 4142 3983 1564 3438 271 3187 2143 1179 1422 4808 4103 4814 3081 1550 2594 679 3404 344 1749 1011 449 4522 3490 2052 757 2508 2035 3087 2578 2330 3765 883 3322 3949 2156 1486 1230 4166 4106 3157 3789 1804 4237 4644 4832 538 2571 1231 83 3391 968 620 3841 4072 430 3715 3034 3594 52 1688 1107 2451 2790 4493 3131 4635 3197 714 231 4226 2122 961 1094 1118 1540 1550 1283 940 3985 679 914 952 983 3030 868 353 562 4129 3178 1719 931 3248 659 378 122 3064 1132 446 86 2986 399 3004 1700 217 4511 4712 3852 3189 4715 3500 4823 2186 2221 1472 4220 4206 376 1077 602 1281 4257 1385 4528 1354 2730 2701 738 2008 3989 3825 302 664 995 3473 4540 2668 1663 2271 2465 2334 3551 4028 799 3523 3877 3738 3999 2832 2187 4404 597 1291 2382 1411 3478 831 1080 1720 460 2630 548 1359 3736 943 1813 396 3447 1040 55 1438 3007 2305 99 4399 2097 672 127 1972 2670 3843 2060 4500 2824 1088 3904 1646 3473 920 1832 3307 1885 891 370 3530 3988 1530 1622 3751 2515 4840 4819 532 2263 4213 1894 3241 2172 1720 1298 3976 780 3088 1683 4340 3075 2980 316 2455 1701 1106 2560 2811 151 2481 3157 1670 552 1329 3876 3378 1137 4060 37 1087 4074 2256 787 1840 4448 2800 3711 744 3710 4914 58 2171 2569 2173 1552 3975 4486 1025 2337 3313 1972 3531 1465 1836 3509 452 2216 2993 3440 3921 3059 1143 2621 1196 3864 2468 3362 4556 3153 3242 825 53 4058 1046 3814 550 169 1123 533 2467 4843 1523 64 3493 3882 2708 1378 647 3834 4460 1989 3734 1011 4453 847 3376 3723 1065 1964 4882 2409 3797 651 3980 4069 4291 1004 4321 4214 2961 4944 2277 1984 4617 3331 1022 1204 1943 992 1609 2287 438 2425 1553 1922 2389 2119 3996 574 2810 3813 2944 4546

TABLE 8s (Rate 13/18) (n_(ldpc) = 16200) 2192 1265 868 3272 569 2864 2608 666 2275 105 2140 2364 299 3944 3601 3720 588 2437 3256 823 1834 2010 1287 96 3400 491 1853 892 3359 202 1517 4347 1598 3895 686 2526 434 28 18 1702 582 3070 1123 1334 3288 1717 1954 3993 2483 2045 35 441 713 2921 3908 2027 3853 2180 1670 1473 2087 2054 3055 2764 1440 2563 1192 2573 3322 4436 4435 1417 1879 1661 1555 2334 1473 2207 4190 172 2640 4281 2091 3492 2509 339 3293 105 3822 445 1170 1350 1994 2696 3867 4048 3816 845 3661 1841 3485 3973 522 4150 3497 1752 284 387 2392 2776 1116 3378 1486 1249 4354 1539 2944 93 1914 1602 2903 3143 3574 179 1280 149 2558 2450 1120 4418 1355 3730 570 4107 4422 4406 1492 4313 4415 2767 1547 4305 1658 1693 289 654 3281 3159 1076 798 3801 1160 462 1419 3371 924 3575 2427 232 4083 1375 29 2364 2909 2843 3668 432 2488 183 4498 752 84 663 3968 1901 2766 2056 1497 1087 3498 4169 933 2713 3947 2418 1075 685 99 1010 1144 851 4150 2141 48 2111 4190 3875 1906 2883 794 2357 662 2065 971 3174 3127 3428 2481 3696 1816 3712 1751 3777 3381 3107 486 2649 3947 4335 1971 401 1539 3940 3111 3506 2088 1113 91 2769 1509 888 1769 960 2853 2485 433 2329 4489 3907 4394 2800 2226 3816 1352 4429 2481 1632 2459 3107 317 2662 1465 624 2078 980 2296 714 3758 838 4479 3212 3165 160 2037 3445 4296 626 2678 254 2577 1510 4195 2262 4158 3656 4026 2203 3427 199 3904 361 471 3274 930 1932 4386 2789 1078 475 2319 1903 1961 3515 1121 1374 3930 3231 1782 36 3846 3586 4292 1220 3459 1843 4285 2959 3197 737 1475 2767 3284 2071 4248 1601 1692 3935 783 1613 4030 3217 3574 4439 2783 1366 1849 1685 3923 2519 2224 559 1215 663 2654 2213 1720 2642 4206 253 3869 2100 1908 738 1269 2067 1314 3511 4104 251 3250 1429 1997 557 2622 2684 4196 3297 4162 1270 3774 4377 1188 1614 178 910 3254 1707 4401 684 1006 1808 933 160 73 4031 2416 131 3480 3545 661 3762 1057 3179 999 1545 4068 352 4394 2240 3846 794 4489 505 1749 781 1561 3982 1960 2888 3246 2468 1277 3752 2091 964 4143 1702 2300 2330 505 3566 4190 1808 2698 2173 4106 1144 1822 4295 462 3187 793 175 3276 415 3371 1725 4436 1079 3227 4428 2968 1471 1103 926 3455 2826 2803 2122 1078 3315 640 387 182 3191 1486 4489 4282 2241 3748 589 4076 2164 567 677 490 3887 2508 1393 764 577 3086 2108 2784 1762 1281 601 460 3810 429 4396 3043 125 1429 1028 3836 2717 3938 279 2184 4248 466 1653 3827 2192 889 1522 2435 3058 3583 1619 2134 3857 3089 814 301 4380 320 1628 3244 3490 1838 2136 632 4093 3101 1319 3738 1154 1331 1965 2897 3650 4390 3487 1768 2578 1487 3465 665 4350 1083 2935 2974 1354 2782 1726 2041 292 2848 4068 118 2581 3525 1283 691 2946 2957 21 1450 3182 1709 2373 1320 2098 3911 1752 2805 2426 2356 2885 3662 175 1446 3774 709 2773 1345 1704 963 912 3353 4220 16 599 463 3105 3157 41 4244 3244 72 410 455 2849 1847 1197 174 4056 2745 1903 1271 171 3511 3072 395 4469 892 2567 2413 1956 2430 1349 4352 2561 1030 2 1809 3416 3973

TABLE 8t (Rate 19/36) (n_(ldpc) = 16200) 1282 5463 2055 1492 6457 6767 3505 1482 1439 6574 60 2796 3840 1600 3301 4638 7064 6019 1981 620 1585 6357 6215 2923 5347 1877 1546 5034 3058 1839 4485 7647 5859 1883 424 2650 5559 1779 574 4934 42 765 2647 3586 4426 4731 1714 2322 3561 5920 4388 5319 217 1430 6897 3410 5416 6595 7285 130 2164 141 7069 6618 2274 2510 5625 1070 6638 6664 3156 6564 7425 3088 3992 7531 1469 2669 763 7347 3322 5053 4922 5014 3202 627 991 1165 3897 6116 7469 1315 4928 1483 1555 2699 2262 2815 2251 1615 6892 6023 1882 4243 3593 3012 3144 1914 6929 3722 3145 3032 3864 4084 1371 657 4019 4635 5898 1009 5077 1866 4950 3746 2553 5393 5486 5144 207 1921 5618 7390 7155 464 494 5977 144 4421 2752 5922 1530 481 3468 321 5883 199 3099 2896 3951 4141 6906 3162 3695 3899 2980 2973 4003 3742 3750 7130 6877 839 2928 2543 5169 5148 2056 41 2080 2599 2722 2416 3253 3228 5591 6946 2811 222 1503 1297 4977 2500 5383 1994 5541 298 3762 2433 1419 5906 237 494 6274 3527 2583 5711 4866 4231 3453 365 2829 5364 6965 3810 4376 885 826 4987 5634 3645 5630 3278 6526 7357 7587 5871 163 4849 1441 4931 5085 1060 6817 906 3155 7471 7393 424 7341 4823 6053 991 7013 7624 2416 4062 3427 6316 7269 947 6047 326 2745 402 6140 4286 2383 6100 6343 5747 1647 5145 2211 3555 4423 5854 3333 6933 3469 594 1374 1127 5235 3114 3804 2214 6081 757 124 2885 2678 3407 2159 2007 5604 2084 2605 4435 3893 1119 5601 4518 1252 5314 7546 5244 2570 1794 6227 4193 3178 2890 4720 5205 2902 3488 5583 3873 5066 967 1809 3834 2284 2649 3798 1431 7547 4545 7423 3136 1389 3355 1919 879 7098 7396 3276 1101 5577 6466 243 6253 7271 1017 3678 2005 2227 1249 6514 7267 2076 4668 4521 7170 2955 1293 741 4839 5039 2957 2363 5604 3846 1306 753 604 2017 2464 6487 2840 7272 6063 7068 42 113 1406 1468 2423 181 1942 5402 4675 1733 1596 5823 3523 1958 994 3816 5818 1244 4898 6341 7032 5426 1432 326 5651 3397 5072 2443 2461 4560 2472 3758 3050 2297 5776 6071 1640 3546 4878 5368 2438 1294 6553 5618 5324 5595 4194 3383 5457 2707 1713 932 3538 1262 5996 6778 1405 6942 3091 4905 6802 3748 5126 4580 243 3252 5151 7106 3489 5405 5216 2129 5194 4300 5641 1046 6143 3885 2161 864 791 6392 1100 5526 2661 4948 6150 925 3893 3038 4340 7175 5967 7475 3905 7246 2988 5017 7236 2542 4959 4592 2020 4870 6237 5239 515 2569 6152 7596 1508 600 2636 5149 3379 969 5263 7120 6849 3730 1755 19 134 908 1085 820 2457 4609 1863 683 3633 1875 4627 122 877 2706 27 6193 2665 7028 1598 3375 6927 5785 1347 5121 3665 1560 2584 4965 1456 3102 5026 914 7416 6150 4030

TABLE 8u (Rate 26/45) (n_(ldpc) = 16200) 3342 3896 286 2799 122 225 3074 527 4736 3291 6197 2055 782 2969 1015 3879 2215 2097 5913 3800 1450 4137 790 1711 4937 623 6654 764 5116 4633 2954 865 2768 1454 1505 4122 723 2893 3735 6674 686 6731 1152 1737 233 2045 6701 3020 2515 1392 1713 4962 3036 5227 4443 4815 5354 2875 4808 5610 912 2730 986 2966 6108 2589 2092 1356 6550 1153 1339 3811 6686 1612 4420 2154 1200 1202 46 5462 3392 2073 2641 2443 178 5965 451 3212 2712 2321 5295 3041 5632 4645 1917 1539 5801 4287 4140 3458 4908 1417 4610 6057 2469 6087 2938 2996 4452 3322 5275 5166 5231 556 2041 2394 5471 6178 3006 5507 6712 5367 70 3959 1974 4989 155 2620 119 3604 1833 3274 3612 4535 3651 1817 1942 2366 1835 1467 3842 4887 1502 5090 525 189 1386 3053 4727 5460 3135 3389 527 2521 2140 4513 5491 4293 5095 689 67 2882 4257 349 3269 3282 4172 3853 5318 2806 4695 1735 4460 6257 1798 4657 2292 2320 2999 4233 5016 3609 278 4528 6127 466 2331 926 6766 1132 3582 4533 678 1157 5108 3778 1832 4139 5790 5090 2141 6398 5184 4222 2042 6207 5466 3168 1871 1264 5917 6314 3659 2310 1742 5445 4140 6000 5150 1155 143 3400 2639 5768 2780 4987 1835 4146 6628 5734 4237 6148 4325 6696 2274 4915 3676 6728 5428 2176 5486 2627 4986 1929 68 742 3802 6509 1799 3406 3884 5524 2206 2757 896 6338 6365 6313 3387 1768 1345 2571 3380 5248 5100 5081 600 5783 4252 5992 5409 2738 1274 806 5715 3236 5172 1209 4525 5625 2842 6628 2395 5353 6118 4629 2380 3807 6094 3715 6294 4945 4441 1998 2041 5513 3323 4863 5342 1204 5258 5620 1792 4297 2964 3532 3457 2602 4708 960 2403 4037 3741 5923 5594 3939 4940 6339 2330 6292 4804 3631 6783 1879 2106 550 5910 2807 6503 4535 5812 4836 2742 35 5825 787 2097 3210 1116 2407 3792 903 5096 6116 4529 3796 2160 6276 3078 3567 3214 5177 3631 1224 285 4740 4420 1573 6196 5175 5035 3928 2295 4470 1737 5276 1239 6625 2942 4132 2375 1607 3463 5951 1281 82 1012 3477 1806 4920 1925 5574 5913 379 983 5057 6791 2752 1852 1132 3663 2878 2753 3655 1523 3624 6439 3113 6090 4755 4901 6589 2815 1145 2363 3350 5683 1992 1301 2028 1707 6200 5759 6062 6802 6165 4302 929 1545 6677 4104 109 3925 185 789 3408 6198 5102 459 2275 4508 5677 6836 4901 2072 6137 2648 2512 4391 5684 5406 2791 4801 2737 1955 3948 1201 3711 4746 1808 3060 3372 3310 555 188 133 3764 3949 2517 173 5046 3770 6557 4844 1249 2441 2706 5831 3683 2025 1935 2155 5753 3247 4264 5927 929 6555 4057 5649 1061 1378 2182 3482 1173 4857 2834 3977 4818 1849 516 3296 6744 4295 1249 2379 5218 386 1945 1673 3218 2083 4442 549 1634 2488 5987 1064 6001 2585 1821 5471 1009 6675 2846 4145 3467 3817 1096 6516 2071 2266 616 6128 6668 6004 5264 6787 5425 2438 2641 5574 6634 3556 780 5997 2387 4854 911 2855 4426 5797 6375 2520 6703 4228 6706 154 3603 3039 900 6570 6006 1980 2520 4509 863 1048 5120 6272 2444 2648 3009 39 455 2371 3763 3299 1389 1369 1042 5140 1690 6798 5400 6540 121 3308 4059 3300 4207 713 2486 4294 5370 4587 4522 3069 4534 5502 1111 3750 6526 750 5578 2265 1483 5754 1394 2879 4317 4966 1429 1891 4930 4675 745 5615

TABLE 8v (Rate 28/45) (n_(ldpc) = 16200) 2216 5353 6062 4045 2714 439 5415 1685 2362 1169 4069 4589 1144 2027 368 1630 3581 3086 1765 399 916 2662 4830 39 4003 2405 4737 4538 3125 2372 3690 4433 4812 3027 3019 5751 2219 883 2853 329 5644 2032 687 631 5202 3622 1372 4048 1947 4836 4630 5995 2000 933 917 1916 3151 4394 500 2889 2079 533 1817 6090 4829 5007 462 1363 4535 2260 2567 3541 3963 639 2123 3398 4196 1880 4933 3898 5325 3699 195 2509 6098 5401 2490 1934 4540 2715 2247 70 2526 5625 5855 3484 5293 3423 4853 2217 3597 5507 3633 5580 978 3900 479 5950 685 5778 186 1898 160 5418 197 2148 3231 3009 1214 2492 4687 3664 3441 4152 4621 3875 5621 2310 3414 3746 1618 1397 429 446 1402 5545 6016 218 255 4024 647 4204 3631 5470 173 871 5457 3157 619 2109 4665 5695 1996 277 5885 3967 5368 2835 5308 1675 4930 633 3581 1814 3494 5422 5575 4330 1686 479 1866 2365 2688 4753 698 5772 5857 2196 895 1433 4470 3550 740 431 418 2955 45 5727 5395 2902 2394 2986 5308 4595 535 1194 1834 632 1280 501 5445 5943 21 6059 5488 5287 2276 985 1833 220 1823 4772 476 5431 1362 9 1039 5597 2429 638 1928 109 5380 3549 2870 2193 5084 1568 74 1281 5299 5525 4099 5879 1684 5362 3542 1402 5044 3685 2767 3204 99 4201 1599 3598 5362 5780 3135 2119 54 986 1831 1858 1152 123 3250 936 4422 1254 1437 1101 615 1899 86 239 3572 3224 5850 3362 4258 1598 2433 1343 4786 40 4646 2069 1058 1453 877 418 1551 3509 4693 1851 1040 3104 388 4688 2306 5765 5836 1650 1988 398 2185 6068 4904 3583 4510 6071 2846 2144 5664 44 3840 2468 2632 5795 2988 3769 515 164 4562 3784 144 6001 5591 6032 1728 3749 3265 2300 4986 3085 1052 5096 2078 4664 1088 1119 6053 5544 11 3944 5079 3955 3576 1087 3175 457 492 5024 4484 174 572 2038 1979 4792 42 2230 587 3850 2663 2563 5654 1013 3026 465 4617 173 4316 1702 2914 5227 965 3472 5892 2667 256 5291 820 2850 1079 1882 4774 5825 5021 178 1791 3300 5047 6031 2350 5957 5190 4900 5174 1441 964 4274 599 1710 5031 2827 5490 3188 4508 628 5088 2262 3594 2622 954 499 76 4082 2678 4959 1174 5858 4221 2400 1477 3539 2175 2334 550 3994 639 5229 1628 4748 4845 157 1272 4726 1588 4984 3113 3011 5302 4257 4843 5548 1230 2197 2376 3119 3906 3481 475 2111 5481 5658 2372 5009 1651 12 2607 5285 5932 2683 1601 463 3431 5828 3783 4119 2358 3276 1966 1515 5809 1550 5938 3060 171 1727 2096 1254 5366 3267 1232 1867 4901 620 592 4316 5369 841 5451 1322 3247 2038 3029 823 4017 2171 408 788 4184 5128 2568 4318 5144 5968 5917 2086 5748 4216 322 5021 5857 1437 2016 2406 3114 1467 2221 3485 2093 2355 5344 3836 2942 3611 595 1241 3973 1357 1795 1685 5201 3401 79 1248 29 2269 2462 3871 4429 501 4446 4931 3977 4761 1207 3693 1461 4852 443 2989

TABLE 8w (Rate 31/36) (n_(ldpc) = 16200) 1271 1259 112 172 1770 1792 355 58 2103 1704 151 1728 542 1193 1157 1387 388 576 252 159 325 2049 1249 242 682 894 1040 1879 1088 233 597 1360 1189 761 1734 353 1039 817 1202 481 1401 855 1310 2033 1358 192 205 1906 860 1749 1216 1195 1550 484 1444 2004 589 1048 1927 883 2115 1203 705 1163 1482 531 2043 1375 504 682 1896 1312 984 845 928 1692 1139 2073 543 1326 219 970 1550 166 79 2110 1152 253 1651 1032 2079 493 764 266 848 1522 469 31 945 1553 564 1144 712 1499 1870 1747 688 1450 1821 58 2060 1607 1502 946 240 1559 668 1214 2213 1426 294 2033 1878 115 986 1285 609 572 257 2245 1605 2006 2152 685 1059 314 737 2055 467 1593 940 1432 1979 2140 1056 562 564 1749 1022 1835 626 1892 2155 266 232 788 222 1608 2062 1723 1480 1439 666 1715 76 325 354 1846 1328 1768 623 361 1766 1660 1351 2052 1977 1504 1224 157 1645 1512 298 1201 50 1606 1917 1846 619 2045 90 1503 1729 911 1252 497 1984 1917 798 1638 1309 1658 1436 1565 1260 1019 1568 1106 371 1361 1316 2074 2175 2146 1618 755 148 1783 1263 2231 918 2061 1546 1441 1356 927 1574 1021 1888 1737 1386 38 1665 1125 1069 744 1512 1136 336 1995 916 430 1673 1022 1799 2175 1391 472 273 1724 410 2180 2169 1411 2238 398 2105 812 1516 162 178 193 1116 1510 1261 1711 1619 1045 1912 451 415 1258 1141 1477 1001 377 1807 543 1352 438 1868 1658 929 2145 176 2042 1934 250 24 1874 825 1230 1170 2075 806 846 2082 2190 134 1471 479 2167 669 1857 590 1131 2078 73 1484 1108 2004 647 306 246 1492 1838 799 914 310 1489 722 1978 39 72 1748 1695 931 666 1559 1192 275 365 1229 1142 1738 1035 1955 1433 1573 1640 1152 1924 83 873 702 1020 1837 1776 2036 1782 441 1755 1498 1210 1513 1070 2193 296 313 300 2187 511 2243 1099 824 1456 1396 258 2243 607 287 1021 1782 1027 1611 1265 316 1153 704 814 1679 978 2192 709 1144 1253 856 64 1989 1251 1880 1434 172 944 1447 1200 776 1010 1844 747 655 582 1313 1664 2197 1385 2168 804 733 1711 981 273 367 161 1003 489 1422 1055 1710 1864 1729 1869 2240 891 567 649 475 952 1503 129 594 200 1215 1906 40 1952 1778 458 52 180 1098 1682 1757 2022 1487 1320 1148 1562 2006 2101 546 783 1711 1366 1141 85 1184 1376 268 1045 720 263 701 1844 1742 938 1909 2171 1093 74 421 1912 1675 309 974 1112 243 1691 139 2151 1557 2208 2057 2196 2135 1657 1026 852 1879 1397 381 2248 968 67 1315 1126 1909 258 955 1342 1238 1010 1499 511 1717 658 1841 831 1993 687 1484 631 2186 1496 625 1438 945 1210 675 1534 1394 1991 1771 1820 550 780 1537 61 1189 278 1672 2149 972 1289 1838 1330 819 348 2220 399 1644 1748 353 890 1477 904 1690 802 203 1529 1338 616 380 1246 806 1383 1237 1580 1651 1369 828 1964 1950 862 840 1356 2087 1674 1477 1996 1506 885 2093 179 282 189 42 992 1516 2005 576 225 470 1543 1320 402 2021 1020 694 2134 165 1499 1474 268 1082 1063 561 242 1111 554 1653 1416 401 19 1753 2064 1052 1447 2035 890 1260 963 1975 1536 1129 1158 984 373 1707 1697 623 1184 8 97 648

FIGS. 5-10 illustrate various simulated performance curves, in accordance with various exemplary embodiments, for the modulation and coding schemes specified herein. FIG. 5 illustrates simulated performance curves for various FEC codes with QPSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention. FIG. 6 illustrates simulated performance curves for various FEC codes with 8PSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention. FIG. 7 illustrates simulated performance curves for the various FEC codes with 16APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention. FIG. 8 illustrates simulated performance curves for the various FEC codes with 32APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention. FIG. 9 illustrates simulated performance curves for the various FEC codes with 64APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention. FIG. 10 illustrates simulated performance curves for the various FEC codes with 256APSK modulation over an AWGN channel, in accordance with exemplary embodiments of the present invention.

FIG. 11 illustrates a flow chart of the encoding and modulation processes described above, in accordance with exemplary embodiments of the present invention. For example, the encoding and modulation process 1100 may be performed by a transmitter 210 as depicted in FIG. 2A. With reference to FIG. 11, the process starts at step 1111, where a source data sequence is received, for example, by the data encapsulation module 211. At step 1113, the encapsulation module encapsulates the source data sequence to form a sequence of baseband frames. At step 1115, the BCH encoder 213 a encodes the baseband frames in accordance with a t-error BCH code to generate respective coded BCH data frames. At step 1117, the LDPC encoder 213 b encodes the coded BCH data frames in accordance with a structured LDPC code to generate coded LDPC data frames. At step 1119, the bit interleaver 213 c interleaves the coded bits of the coded LDPC data frames to generate coded FEC frames. At step 1121 the modulator 215 modulates the coded FEC frames in accordance with a selected modulation scheme for transmission over the wireless satellite channel 114.

FIG. 12 illustrates a flow chart of an exemplary process for demodulating and decoding a received data signal transmission to replicate a source data sequence of information bits that was encoded and modulated as described above, in accordance with exemplary embodiments of the present invention. For example, the encoding and modulation process 1200 may be performed by a receiver 220 as depicted in FIG. 2B. With reference to FIG. 11, the process starts at step 1211, where the data signals transmitted over the satellite channel 114 are received by the receiver 220. At step 1213, the sync module 227 detects the unique word and acquires synchronization. At step 1215, the receiver decodes header information to determine the modulation scheme and coding scheme (e.g., the interleaving method, LDPC inner coding and BCH outer coding applied at the transmitter. The decoding of the header information, for example, may be performed by the sync module 227 or the decoder module 223 (or by another module of the receiver configured to perform such header decoding—not shown in FIG. 2B). At step 1217, the demodulator 225 demodulates the received data signals based on the determined modulation scheme to generate a received replica of the transmitted FEC frames. At step 1219, the decoder 223 de-interleaves the demodulated data frames based on the determined interleaving method. At step 1221, the decoder 223 decodes the de-interleaved data based on the determined LDPC inner coding. At step 1223, the decoder 223 further decodes the data frames based on the determined BCH outer coding. Then at step 1225, the data de-encapsulation module de-encapsulates the decoded data frames to generate a replica of the original source data sequence.

FIG. 13 illustrates a block diagram of a chip set that can be utilized in implementing communications system protocols, according to exemplary embodiments of the present invention. With reference to FIG. 13, chip set 1300 includes, for instance, processor and memory components described with respect to FIG. 5 incorporated in one or more physical packages. By way of example, a physical package includes an arrangement of one or more materials, components, and/or wires on a structural assembly (e.g., a baseboard) to provide one or more characteristics such as physical strength, conservation of size, and/or limitation of electrical interaction.

In one embodiment, the chip set 1300 includes a communication mechanism such as a bus 1301 for passing information among the components of the chip set. A processor 1303 has connectivity to the bus 1301 to execute instructions and process information stored in, for example, a memory 1305. The processor 1303 includes one or more processing cores with each core configured to perform independently. A multi-core processor enables multiprocessing within a single physical package. Examples of a multi-core processor include two, four, eight, or greater numbers of processing cores. Alternatively or in addition, the processor 503 includes one or more microprocessors configured in tandem via the bus 1301 to enable independent execution of instructions, pipelining, and multithreading. The processor 1303 may also be accompanied with one or more specialized components to perform certain processing functions and tasks such as one or more digital signal processors (DSP) 1307, and/or one or more application-specific integrated circuits (ASIC) 1309. A DSP 1307 typically is configured to process real-world signals (e.g., sound) in real time independently of the processor 1303. Similarly, an ASIC 1309 can be configured to performed specialized functions not easily performed by a general purposed processor. Other specialized components to aid in performing the inventive functions described herein include one or more field programmable gate arrays (FPGA) (not shown), one or more controllers (not shown), or one or more other special-purpose computer chips.

The processor 1303 and accompanying components have connectivity to the memory 1305 via the bus 1301. The memory 1305 may comprise various forms of computer-readable media, e.g., including both dynamic memory (e.g., RAM) and static memory (e.g., ROM) for storing executable instructions that, when executed by the processor 1303 and/or the DSP 1307 and/or the ASIC 1309, perform the process of exemplary embodiments as described herein. The memory 1305 also stores the data associated with or generated by the execution of the process.

The term “computer-readable medium” or “computer-readable media,” as used herein, refers to any medium that participates in providing instructions for execution by the processor 1303, and/or one or more of the specialized components, such as the one or more digital signal processors (DSP) 1307, and/or one or more application-specific integrated circuits (ASIC) 1309. Such a medium may take many forms, including but not limited to non-volatile media, volatile media, and transmission media. Non-volatile media include, for example, read only memory (ROM), included within memory 1305. Volatile media, for example, may include dynamic random access memory (RAM), included within memory 1305. Transmission media may include copper or other conductive wiring, fiber optics, or other physical transmission media, including the wires and/or optical fiber that comprise bus 1301. Transmission media can also take the form of wireless data signals, such as those generated during radio frequency (RF) and infrared (IR) data communications. Common forms of computer-readable media include, for example, magnetic storage media (e.g., magnetic hard disks or any other magnetic storage medium), solid state or semiconductor storage media (e.g., RAM, PROM, EPROM, FLASH EPROM, a data storage device that uses integrated circuit assemblies as memory to store data persistently, or any other storage memory chip or module), optical storage media (e.g., CD ROM, CDRW, DVD, or any other optical storage medium), a or any other medium for storing data from which a computer or processor can read.

Various forms of computer-readable media may be involved in providing instructions to a processor for execution. For example, the instructions for carrying out at least part of the present invention may initially be borne on a magnetic disk of a remote computer. In such a scenario, the remote computer loads the instructions into main memory and sends the instructions over a telephone line using a modem. A modem of a local computer system receives the data on the telephone line and uses an infrared transmitter to convert the data to an infrared signal and transmit the infrared signal to a portable computing device, such as a personal digital assistance (PDA) and a laptop. An infrared detector on the portable computing device receives the information and instructions borne by the infrared signal and places the data on a bus. The bus conveys the data to main memory, from which a processor retrieves and executes the instructions. The instructions received by main memory may optionally be stored on storage device either before or after execution by processor.

Moreover, as will be appreciated, a module or component (as referred to herein) may be composed of software component(s), which are stored in a memory or other computer-readable storage medium, and executed by one or more processors or CPUs of the respective devices. As will also be appreciated, however, a module may alternatively be composed of hardware component(s) or firmware component(s), or a combination of hardware, firmware and/or software components. Further, with respect to the various exemplary embodiments described herein, while certain of the functions are described as being performed by certain components or modules (or combinations thereof), such descriptions are provided as examples and are thus not intended to be limiting. Accordingly, any such functions may be envisioned as being performed by other components or modules (or combinations thereof), without departing from the spirit and general scope of the present invention.

While exemplary embodiments of the present invention may provide for various implementations (e.g., including hardware, firmware and/or software components), and, unless stated otherwise, all functions are performed by a CPU or a processor executing computer executable program code stored in a non-transitory memory or computer-readable storage medium, the various components can be implemented in different configurations of hardware, firmware, software, and/or a combination thereof. Except as otherwise disclosed herein, the various components shown in outline or in block form in the figures are individually well known and their internal construction and operation are not critical either to the making or using of this invention or to a description of the best mode thereof.

In the preceding specification, various embodiments have been described with reference to the accompanying drawings. It will, however, be evident that various modifications may be made thereto, and additional embodiments may be implemented, without departing from the broader scope of the invention as set forth in the claims that follow. The specification and drawings are accordingly to be regarded in an illustrative rather than restrictive sense. 

What is claimed is:
 1. A method comprising: encoding, by a processor of a device, a source data sequence of information bits based on a predetermined structured parity check matrix of a Low Density Parity Check (LDPC) code, wherein the encoding is performed based on frames of the source data sequence, each frame being of a length of k_(ldpc) information bits (i₀, i₁, . . . , i_(k) _(ldpc) ⁻¹), and the output of the encoding comprises coded LDPC frames each being n_(ldpc) coded bits in length, and wherein the structured parity check matrix is represented by tabular information of a format wherein each row represents occurrences of one values within a respective column of the parity check matrix, and the columns of the parity check matrix are derived according to a predetermined operation based on the respective rows of the tabular information, and wherein the tabular information comprises a one of Tables 1a through 1w (below); wherein the encoding comprises generating n_(ldpc)−k_(ldpc) parity bits (p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹) for each frame of the source data sequence, wherein the generation of the parity bits comprises: initializing parity bit accumulators for p₀, p₁, . . . , p_(n) _(lpdc) _(−k) _(lpdc) ⁻¹ to zero; accumulating information bit i₀ at parity bit accumulator addresses specified in the first row of the table; for the next group of m−1 information bits, i_(y) (y=1, 2, . . . , m−1), accumulating each information bit at parity bit accumulator addresses {x+(y mod m)*q} mod (n_(ldpc)−k_(ldpc)), wherein x denotes an address of a parity bit accumulator corresponding to the information bit i₀, and q is a code-rate dependent constant (q=(n_(ldpc)−k)/m), and wherein m is a code-dependent constant and k=R*n (where R is the code rate); accumulating i_(m) at parity bit accumulator addresses specified in the second row of the table, and, in a similar manner as for the group of m−1 information bits (above), accumulating each information bit of the next group of m−1 information bits i_(z), z=(m+1, m+2, . . . , 2m) at {x+(z mod m)*q} mod (n_(ldpc)−k_(ldpc)), wherein x denotes the address of the parity bit accumulator corresponding to the information bit i_(m) (the entries of the second row of the table); in a similar manner, for each subsequent group of m information bits, accumulating the information bits at parity bit addresses based on a next row of the table; and after all of the information bits of the frame are accumulated, performing operations according to p_(i)=p_(i) ⊕p_(i−1), wherein for i=1, 2, . . . , (n_(ldpc)−k_(ldpc)−1), each p_(i) resulting from the operation for a given i is equal to the parity bit p_(i); TABLE 1a (Rate 1/5) (n_(ldpc) = 64800) 30434 15118 35871 1042 34043 34085 42341 18485 44500 24268 28843 51748 21972 30300 24347 46808 8416 11111 41481 32215 4130 867 22576 9928 23980 15170 43863 15038 42905 19719 398 39956 47109 48347 26991 18214 24206 47552 15884 49234 51671 11523 41411 21249 16660 17729 852 21114 22858 19843 10501 37683 33159 15595 43687 9791 41121 30595 50762 36562 30611 6196 16501 1860 19594 45948 42827 9110 2671 44915 51640 33959 16649 37658 45143 11861 37 13823 3703 41861 6198 39321 37404 36745 7515 37433 17583 30253 42537 16920 44989 37745 27350 9903 13623 50660 35965 29455 36432 49774 8755 33362 12907 10543 34407 13960 9808 41065 17820 41780 13846 25968 45228 51694 1005 14230 7622 34849 38545 36256 10235 39642 27136 13787 42968 28454 9406 5612 9674 15364 45347 13550 44977 39547 37964 33817 48680 49571 37335 47548 45117 26148 17828 50113 9061 27964 47828 8518 12777 9523 45788 14839 30154 35408 42366 48162 32305 18501 34537 3974 41796 46590 39195 43248 28063 25179 21119 42374 46860 12591 49973 16248 31005 46401 45858 18919 39056 2622 31398 7488 40408 21230 7021 46583 18669 3999 46160 17929 25853 46018 16689 33374 14070 31593 44601 49986 25832 37105 12112 33290 8907 41215 28842 38633 191 17402 29860 28641 12889 28172 1706 23997 18785 3728 43051 43506 28074 20093 25247 4390 3534 35866 5423 48667 31399 44664 42319 17038 19121 2653 3699 43234 5448 2965 5554 6606 46032 10606 34309 48885 30552 28313 15011 35464 35537 42531 47350 49896 34368 50709 33315 29146 27506 37421 7219 5613 19620 22073 21932 40199 36978 30032 22322 39521 22458 18157 28917 42547 10696 22422 42365 45341 34234 4869 37037 6282 42657 1832 25254 24440 13374 34902 36356 9003 17404 29739 5586 29932

TABLE 1b (Rate 2/9) (n_(ldpc) = 64800) 5332 8018 35444 13098 9655 41945 44273 22741 9371 8727 43219 41410 43593 14611 46707 16041 1459 29246 12748 32996 676 46909 9340 35072 35640 17537 10512 44339 30965 25175 9918 21079 29835 3332 12088 47966 25168 50180 42842 40914 46726 17073 41812 34356 15159 2209 7971 22590 20020 27567 4853 10294 38839 15314 49808 20936 14497 23365 22630 38728 28361 34659 956 8559 44957 22222 28043 4641 25208 47039 30612 25796 14661 44139 27335 12884 6980 32584 33453 1867 20185 36106 30357 809 28513 46045 27862 4802 43744 13375 36066 23604 30766 6233 45051 23660 20815 19525 25207 27522 3854 9311 21925 41107 25773 26323 24237 24344 46187 44503 10256 20038 12177 26635 5214 14191 34404 45807 4938 4173 31344 32043 26501 46725 4648 16718 31060 26633 19036 14222 13886 26535 18103 8498 36814 34600 36495 36712 29833 27396 11877 42861 1834 36592 1645 3649 30521 14674 3630 890 13307 41412 24682 9907 4401 44543 13784 5828 32862 25179 29736 39614 5186 49749 38317 41460 39101 50080 40137 32691 26528 35332 44067 8467 14286 10470 12211 34019 37870 36918 36419 33153 50070 41498 47741 30538 12342 33751 23988 33624 41882 34075 25552 3106 17611 13190 29336 312 5667 35483 35460 16153 37267 28308 50009 46345 34204 32756 38243 5657 24157 36834 6890 49576 46244 43875 16738 47225 2944 36882 30341 48485 3700 14451 20438 18875 13634 41138 42962 46459 13369 27974 21493 14629 2369 11351 40226 42457 34749 39000 3912 18128 46776 47055 2221 26806 11345 35143 630 2229 44009 41295 34646 32163 16657 26544 31770 23641 43623 45826 10902 39490 7514 20480 28511 11429 19834 35430 50112 38163 5738 16191 16862 6783 6085 39149 34988 41497 32023 28688

TABLE 1c (Rate 13/45) (n_(ldpc) = 64800) 15210 4519 18217 34427 18474 16813 28246 17687 44527 31465 13004 43601 28576 13611 24294 15041 503 11393 26290 9278 19484 20742 13226 28322 32651 27323 22368 15522 37576 20607 20152 19741 26700 31696 21061 35991 44168 27910 31104 34776 38835 45450 40002 31522 7807 26330 2410 44983 15861 39215 14631 42584 26502 41864 27885 32276 29049 16878 37480 42550 38795 13012 7912 4058 23869 3325 42889 19921 13826 40323 18162 10005 35100 5483 7629 35166 1239 10772 5289 286 16172 41843 42612 38493 11997 40340 19047 16236 43557 9104 24032 2915 19265 36209 6443 40947 43527 29675 4195 31926 35392 20400 7515 45806 36068 33079 37325 6301 4580 20492 40934 14478 8238 2425 28901 43602 7224 17640 28259 6850 41859 14006 19132 5690 16223 11575 30562 44797 3759 9833 36529 21084 45546 16044 26763 13559 29092 41595 5726 13733 9164 15354 20145 10655 24076 40883 13424 30325 40589 32367 36270 9286 40151 8501 3871 22109 26239 29805 5358 44835 11609 3899 9760 39600 43422 13295 45431 14515 5392 37010 12386 40193 21492 45146 12376 41952 43153 45733 718 35726 33884 38006 16927 20958 25413 44561 11245 12984 35198 30977 31916 10657 1412 1048 14965 31879 29967 41000 32087 22 34773 768 27289 19898 43051 6964 31807 4119 33509 15950 6304 2813 35192 38282 39710 26356 9889 18957 6355 18770 40381 1876 38889 17958 20309 10744 1744 228 41543 36505 32795 12454 8520 4916 22313 1363 13010 8770 17057 8694 22987 29564 13804 3110 1382 33844 15117 42314 36045 25295 28421 22044 15951 42952 17458 6926 21257 41243 8662 17046 15054 15302 16964 40079 13359 45754 16715 9586 10960 25406 14675 8880 5087 12303 28993 13571 24824 31012 4121 808 30962 28736 11013 20488 7715 7637 6217 25114 23615 5760 5554 18072 21605 39242 24190 6592 12281 44681 6563 7001 18291 19605 33476 2884 30927 18430 23674 36414 30649 15364 22089 19757 41162 14454 17627 16676 28573 22163 8851 36803 27589 40049 476 1413 41013 34505 33296 29782 38018 42124 22625 7485 11772 2052 37567 14082 30106 43203 20858 7399 3796 22396 38745 792 44483 28268 33355 41030 30098 37269 12871 35769 33119 16738 3307 43434 13244 17852 9133 23190 35184 20115 24202 14760 43026 19425 26414 16821 6625 30362 35769 42608

TABLE 1d (Rate 9/20) (n_(ldpc) = 64800) 30649 35117 23181 15492 2367 31230 9368 13541 6608 23384 18300 5905 1961 8950 20589 17688 9641 1877 4937 15293 24864 14876 6516 10165 4229 26034 28862 8265 27847 3 22728 13946 27162 26003 17696 13261 31719 25669 17149 17377 33106 12630 4814 16334 1480 32952 11187 3849 30186 20938 7946 23283 11042 28080 26642 34560 11302 4991 5121 6879 13445 22794 18048 15116 5657 9853 15581 34960 13240 11176 17937 25081 4868 28235 30286 29706 7073 6773 10390 27002 13015 7388 14772 19581 11765 16642 11431 19588 20154 8027 29758 5501 6398 4268 21337 21136 2275 7899 25943 12939 14478 20369 22877 3591 12217 19130 24252 32444 24599 21382 4689 3524 11304 20423 13677 19639 10577 28279 22330 30722 21622 26233 3921 17722 6843 5999 8186 2355 33632 34632 30285 9616 19909 30417 19587 27853 13896 3689 155 20457 33362 21739 22779 33862 3713 32975 9403 2836 23109 11099 3505 14562 17309 26470 4843 12279 24216 26340 22073 32570 12936 19797 21801 8918 7999 24408 5783 25190 8817 29367 17017 6208 21402 2280 2110 7975 32039 34605 1235 912 23116 33017 31405 638 4707 31760 18043 3507 11989 26632 32829 11262 9274 2553 10697 13507 15323 27080 3752 33191 12363 24664 14068 1416 21670 26696 18570 25197 1517 7765 32686 6572 30901 28242 17802 24056 35388 26895 8023 31249 29290 13440 7156 17367 21472 27219 14447 9655 11100 27918 2900 33262 15301 4664 15728 1185 24818 32995 31108 16368 34978 31690 30464 13044 5492 10047 2768 14336 30880 32780 10993 24750 7022 19718 26036 19145 21177 33949 17135 5193 33718 2539 13920 25537 918 18514 14530 13699 11902 22721 8335 35346 24655 3332 14708 20822 11191 24064 32825 12321 11771 23299 31325 25526 16785 22212 34075 9066 31209 27819 5974 19918 26831 33338 26647 9480 28489 7827 18562 2401 17395 23192 10277 28458 23028 18793 10463 10740 616 24647 4153 10128 2873 22381 8132 18239 31614 4193 32313 7575 25801 27591 19872 17992 4609 9114 14764 13516 19192 9882 13112 16075 12510 28902 8784 32679 4578 34533 30609 25543 13739 3465 5330 999 33254 13085 5001 29061 28369 79 17750 13399 24851 9524 30966 10422 18251 34810 12259 25103 25193 16945 1059 11266 13612 30508 24778 25364 1322 14492 11111 13693 15125 8205 1749 8494 9902 9395 23936 3981 22799 28448 28076 26544 19652 13424 8915 2885 11356 3241 1609 10284 24350 2462 19358 15717 29327 15960 14743 5388 32927 1288 19074 6322 32214 34208 30535 35462 23415 20836 21819 17986 12196 30030 8422 2647 5710 3200 23132 23337 22307 29841 4813 15309 26942 29970 23288 7493 3005 20661 34283 33192 23033 9541 6424 22003 24665 5534 4684 1411 33340 26042 6426 3808 285 21942 14302 16023 6825 20084 34878 12295 32028 2591 178 24107 16379 2912 9912 15375 16120 28375 20170 726 11291 8185 13471 8448 23205 14239 17896 17950 19308 1591 3170 23836 18879 12853 10678 18431 21157 31624 3153 27682 12433 3458 312 4844 13138 17715 35138 15456 30507 33307 30783

TABLE 1e (Rate 19/36) (n_(ldpc) = 64800) 4852 21528 7920 5827 25497 26912 13790 5647 5349 26209 30575 10701 15230 6020 12821 18153 28229 23784 7846 2405 6175 25057 24745 11338 20902 7232 5966 20079 11898 7024 17575 30172 23114 7408 1444 10470 21964 6794 1849 19639 42 2805 10297 14296 17686 18756 6814 9207 13761 23515 17223 21044 557 5255 27297 13440 21226 26060 28875 300 8454 396 27979 25998 8734 9820 22370 3875 26358 26384 12591 26114 29610 12183 15722 29971 5804 10489 2548 29277 13097 19843 19372 19804 12467 2412 3711 4225 15202 24051 29399 5140 19293 5563 5975 10604 8722 11230 8796 6205 27377 23788 7237 16738 14133 11767 12239 7354 27329 14432 12580 11872 15339 16324 5281 2272 15919 18405 23238 3644 20037 7221 19740 14881 9948 21458 21721 20274 632 7531 22448 29320 28575 1484 1684 23572 314 17511 10742 23432 6120 1756 13668 831 23308 709 12194 11481 15426 16126 27391 12597 14490 15204 11820 11558 15988 14707 14715 28040 27022 2964 11343 9853 20469 20448 7921 30386 8030 10079 10797 9471 12773 12408 22081 27431 11141 647 5583 4867 19597 9640 21448 7774 22031 978 14982 9318 5329 23331 747 1599 24719 13982 10148 22796 19316 16641 13398 1385 11074 21429 27365 15030 17211 3435 3121 19692 22379 14270 22290 12713 25821 29202 30112 23466 418 19299 5266 19721 19875 4120 27217 3456 12505 29571 29323 1359 29271 18848 23988 3711 27838 30064 9471 15792 13372 25101 28859 3582 24067 921 10735 1252 24500 16866 9523 24035 25043 22577 6407 20445 8841 13840 17428 23024 13023 27418 13669 2039 5284 4272 20790 12124 14854 8589 24186 2542 124 11300 10583 13607 8364 7702 22179 8034 18294 25817 9609 29141 26471 28410 0 28693 25766 12550 25246 15174 21691 27153 3960 7108 15248 8867 8637 7526 25098 25457 9549 4919 29817 17975 29608 12231 5214 13215 7529 3174 28008 29496 12796 3906 11660 28238 4295 24868 28946 3822 14643 7700 8772 4564 25809 28687 16723 12784 545 1026 24533 10526 2781 18949 19829 11457 8993 22179 15321 4961 2623 2304 7882 9519 1755 19477 14008 20611 17807 13434 20328 25809 15475 20333 14032 22015 9478 521 7297 11756 11083 30411 6101 23078 13808 7653 3799 14951 12091 8232 4961 10525 4842 4867 13342 20032 9328 14808 11890 9097 1406 17654 21576 13916 19328 21178 9578 4949 26018 16604 13328 21777 18932 7321 2070 7697 14266 9879 12271 19185 26947 14798 20341 18010 753 12687 20366 16795 22301 4021 24333 15105 8536 13240 28609 17761 5504 518 17937 3329 3001 25432 26541 3002 3436 16197 9838 15328 16775 26537 2795 25184 7045 17243 22843 12232 10984 15198 11963 17345 12186 18466 29254 26266 21216 1565 17729 29158 7355 4837 1356 28911 6749 26024 20177 19405 24682 20539 23639 23171 19707 1278 1465 17435 10327 16584 14678 15700 28585 6210 24813 1477 19918 7305 17774 20937 30288 20203 23788 21655 16483 18985 17501 28765 13494 25663 1925 12695 7109 16881 2053 12382 4765 11370 13410 10697 9692 29500 21773 16350 12204 23752 14420 29567 3862 8483 5243 12830 24323 27405 20033 30085

TABLE 1f (Rate 11/20) (n_(ldpc) = 64800) 20834 22335 21330 11913 6036 15830 11069 10539 4244 15068 7113 2704 16224 2010 5628 27960 11690 22545 24432 4986 21083 17529 4104 11941 21239 9602 689 13248 1777 4876 2537 20869 15718 9575 18164 5294 13914 21711 23374 9675 21239 13600 24710 10613 14804 19412 23270 26741 10503 25258 17816 25210 12518 8680 6422 22715 25097 26959 3913 26493 7797 25977 4896 27063 20781 21715 12850 7963 4027 4295 14931 18158 616 20570 8720 16487 19050 23925 7939 21089 15170 24325 6651 22352 5633 27903 2685 1310 5594 9296 25670 25121 13906 8217 25390 9112 13945 9826 10844 11418 10724 11518 9280 9576 25979 23644 16073 27407 3476 28057 4003 2279 17490 7558 9538 22115 20439 20708 22572 14997 15780 5159 11356 10931 8514 23275 2560 912 15935 20703 26467 17173 21964 15469 21967 10380 16222 15106 16786 19542 28560 18387 27909 14897 6167 24295 1266 16902 9546 11628 12048 24495 3706 22629 14165 2333 19403 18738 28140 13141 6151 22785 9620 4290 2342 4902 15856 19033 22820 15761 1985 9160 4435 11164 5442 23572 6951 19077 15406 16658 18324 19229 16997 10094 19982 22821 7810 19660 1182 21968 16564 17453 10780 17034 16405 11 28611 10411 15799 15705 2773 28601 19333 19447 16790 4618 15841 23854 24686 4131 1013 2141 6052 11896 18719 16813 22420 23406 21052 4333 17754 16425 17614 26883 12101 8224 13979 6869 25215 25991 28968 19337 25361 20513 1671 14990 20692 24951 19446 7163 4959 13197 19201 3883 22532 15468 11856 22758 23586 16985 18396 7434 11817 363 11824 285 20897 16646 16095 17011 25144 14916 6302 20972 25439 6156 21776 19701 27803 9695 12941 23541 27425 6979 27910 7378 8983 6280 4134 28860 8079 20892 28776 7899 23399 87 18045 23929 25876 15560 23629 18376 4053 14655 2450 11907 19535 28543 3513 4704 16512 16554 14062 2596 10357 17316 1011 22090 11353 20300 15300 18536 14293 4746 28831 20028 16742 16835 28405 11245 10802 20242 17737 9590 20693 26547 22557 22517 6285 5336 3998 2351 6628 22949 1517 4712 1770 9207 28522 14116 5455 13105 18709 3030 4217 6306 27448 1943 23866 20212 18857 14794 21425 15659 4446 21140 13454 21115 3271 1443 2153 12424 6159 23559 22473 26065 15914 22980 12766 3482 16233 5719 27020 12322 24014 25438 26499 26506 21987 16027 6832 17330 2620 20756 15985 10471 23302 593 6869 27185 22961 9129 25646 10702 12334 23959 6375 23299 26942 8029 4072 24051 15147 5113 14725 1451 27291 28731 18808 11561 249 28962 21405 18944 6889 3314 23457 27708 14530 8795 6185 28821 6550 2259 17627 701 20819 18831 20140 4991 11369 4282 13230 3413 27092 14556 5068 16209 4337 24652 498 715 28883 2285 16524 25513 26034 21067 15122 21667 27982 15280 3313 7563 22779 22453 4744 17277 27210 19170 10806 18815 26424 26442 7837 26264 28931 6020 4645 20678 13160 18111 28045 23883 5128 10876 3087 28551 26276 3541 20152 10181 28172 26430 14769 6809 4956 16130 11348 1691 10216 5743 7848 20236 2661 10660 8321 6155 2757 6963 2596 27791 6707 258 12785 21176 15450 7477 17274 25201 262 18996 15836 5287 11970 13365 3098 17823 10786 21831 14476 11447 1893 3625 25404 20880 21987 1228 20942 15045 21358 18237 28914 15673 24273 284 9803 13949 15670 16693 15553 27782 22644 27980 24820 27733 7015 20974 10016 26164 20314 25916 11489 13663 11777 18230 11483 5655 1618 19977 26521 25639 13184 28994 3821 18349 13846

TABLE 1g (Rate 26/45) (n_(ldpc) = 64800) 12918 15296 894 10855 350 453 11966 1667 18720 12943 24437 8135 2834 11861 3827 15431 8827 8253 23393 15048 5554 16297 2994 6727 19453 2371 26414 3044 20240 18313 11618 3145 10976 5786 5609 16358 2547 11557 14755 26434 2510 26719 4420 6753 917 7821 26765 11684 9811 5420 6653 19554 11928 20579 17439 19103 21162 11235 19172 22254 3420 10558 3646 11858 24120 10189 8172 5004 26082 4345 5139 15135 26522 6172 17492 8462 4392 4546 27330 21498 13424 8077 10165 9739 482 23749 1515 12788 10464 9085 20875 12009 22276 18401 7541 5871 23053 16979 16300 13566 19424 5293 18290 23917 9613 24175 11374 11736 17676 13126 20931 20290 20659 2000 7969 9386 21507 24494 11822 21771 26776 21175 27354 15815 7598 19809 611 10144 195 14244 7229 13002 14328 17987 14595 6985 7642 9434 7079 5571 10013 3641 14064 11716 4620 18119 23365 26446 26273 25164 11262 26019 15166 19403 5606 20138 1893 645 5414 12097 18635 21648 12255 13269 1895 9969 8372 17737 21679 17061 20219 2513 27199 11242 17025 1261 12845 13086 16256 15177 20822 10862 18375 6751 17532 24725 6966 18489 8373 25550 20688 16686 7894 24599 21578 12516 7115 4836 23473 25162 14375 9150 6606 21633 16224 23708 20350 4575 143 13356 10239 22868 10760 19807 7079 16382 26236 22606 16777 24312 16941 26684 8658 19279 15136 8603 332 2898 21821 23778 3232 12052 14336 7832 5600 27015 14392 26564 21616 8332 21750 10379 19730 7553 27352 2718 15202 25661 6891 13210 15284 21940 8742 10965 3176 25034 25137 25161 13267 7012 4993 9943 13260 20980 20224 20129 2120 23111 16640 23548 21445 10794 4846 2858 22663 12584 20448 4629 17825 22269 11278 26312 9463 21085 24282 18233 9220 14979 24106 14507 24838 19689 17589 7926 7893 21701 12253 26122 8035 20823 2584 4703 25178 5460 4190 7057 1144 8426 12354 7216 19484 4110 22105 1452 11457 12539 27106 14256 14113 20701 2547 26926 25933 11919 12026 24639 19741 15457 9239 26713 22838 6051 8782 14714 23363 450 19972 2622 19473 24182 2391 26205 10018 9202 15690 10472 20263 469 18876 23660 9005 12595 23818 26430 926 6156 5440 5209 14958 9882 18843 22063 12749 18473 22546 11768 4493 12833 18540 3544 9471 15893 14761 23479 22010 15491 19608 25035 9094 24836 15909 16594 23538 25136 25063 24995 5354 905 18580 15476 20710 7774 6088 17133 11498 4721 17594 18267 1645 23638 26645 14800 17920 22016 12927 350 19391 19447 19886 25992 26120 1747 11234 1588 23170 27232 2230 15468 18709 17410 11055 20645 3244 25815 14204 2858 7980 12780 3256 20418 24355 24260 16245 20948 11122 1503 15651 19272 24054 6075 4905 931 18884 23633 17244 6067 5568 26403 490 16113 16055 10524 23013 8138 12876 20699 20123 15435 27272 27296 22638 7658 17259 20553 14914 17891 12137 16323 1085 18895 21503 17141 2915 21979 23246 1271 14409 11303 12604 25591 12157 14704 18739 19265 8140 11244 5962 6647 3589 6029 6489 16416 185 9426 1267 14086 22473 17159 22404 23608 7230 22514 21605 7645 1239 10717 12028 13404 12140 14784 15425 14895 26165 18980 15386 14399 7725 14908 8463 22853 22095 5517 1854 8283 24381 260 12595 839 23743 22445 13473 8017 7716 8697 13050 16975 26656 16911 11972 26173 2504 15216 7493 6461 12840 4464 14912 3745 21461 9734 25841 4659 7599 9984 17519 7389 75 12589 9862 8680 23053 21981 25299 19246 3243 15916 21733 4467 26491 4959 10093 20074 9140 15000 12783 854 10701 25850 13624 7755 10789 3977 15812 10783 5830 6774 10151 21375 25110 5830 15985 18342 2623 4716 27211 18500 18370 12487 7335 4362 21569 16881 10421 15454 13015 5794 1239 9934

TABLE 1h (Rate 28/45) (n_(ldpc) = 64800) 24402 4786 12678 6376 23965 10003 15376 15164 21366 24252 3353 8189 3297 18493 17994 16296 11970 16168 15911 20683 11930 3119 22463 11744 13833 8279 21652 14679 23663 4389 15110 17254 17498 13616 426 18060 598 19615 9494 3987 8014 13361 4131 13185 4176 17725 14717 3414 10033 17879 8079 12107 10852 1375 19459 1450 4123 2111 17490 13209 8048 15285 4422 11667 18290 19621 2067 15982 304 8658 19120 6746 13569 19253 2227 22778 23826 11667 11145 20469 17485 13697 3712 4258 16831 22634 18035 7275 23804 14496 17938 15883 14984 15944 2816 22406 22111 2319 14731 8541 12579 22121 8602 16755 6704 23740 16151 20297 9633 1100 19569 10549 19086 21110 11659 6901 21295 7637 11756 8293 9071 9527 9135 7181 19534 2157 788 13347 17355 17509 711 20116 21217 15801 12175 9604 17521 2127 21103 1346 8921 7976 3363 11036 5152 19173 8086 3571 1955 4146 13309 15934 19132 5510 12935 13966 15399 16179 8206 19233 16702 7127 12185 15420 1383 6222 6384 20549 18914 23658 11189 638 9297 17741 9747 13598 17209 11974 20776 2146 9023 3192 19646 3393 1727 15588 20185 5008 3885 5035 15852 5189 13877 15177 3049 22164 16540 21064 24004 10345 12255 36 24008 8764 13276 13131 2358 24010 16203 21121 21691 8555 11918 129 8860 23600 3042 3949 19554 12319 22514 11709 11874 11656 536 9142 3901 580 1547 10749 5529 3324 6251 1156 112 13086 5373 5119 132 18069 10482 19519 17279 2017 14846 21417 17154 21735 18788 11759 192 16027 6234 20417 3788 15159 22188 21251 16633 13579 8128 1841 23554 15056 12104 9182 6147 1553 12750 4071 6495 4961 18460 23266 10785 10973 4405 2707 7665 7043 1968 3589 15378 9642 21148 13073 13298 20040 13582 17124 348 12055 378 7476 9838 15454 5218 14834 17678 3445 18453 2767 388 12638 5688 56 6360 20009 872 16872 10206 5551 477 10662 23689 19768 8965 17535 4421 19397 18734 5422 10043 22104 21682 508 1588 23853 1092 7288 4358 2283 22298 10504 15022 8592 22291 11844 17038 2983 17404 14541 6446 20724 7498 2993 14715 9410 6844 20213 14674 263 4822 20951 635 20651 23174 5057 22237 9229 4859 17280 9586 20334 19508 8068 11375 5776 21209 9418 6872 6349 20397 11165 19619 13108 13550 10715 5122 5655 10699 8415 9864 4985 7986 6436 3754 7690 4257 17119 5328 659 4687 6006 527 10824 8234 11291 1735 22513 7254 2617 1493 3015 7462 10953 15705 2181 11992 4628 19430 18223 9426 21808 13549 17008 3470 22568 13643 24195 21816 936 14226 22874 6156 19306 18215 23984 14714 12907 5139 18639 15609 11908 5446 8958 6315 16864 15814 10686 22570 16196 203 4208 13716 494 14172 11778 15112 14244 8417 21087 4602 15570 19758 4401 22270 8218 11940 5009 23833 13785 12569 1698 7113 18541 18711 19991 19673 8025 17107 14784 5954 6817 19810 24143 12236 18063 23748 23956 10369 7805 13982 13861 5198 10889 6787 10406 13918 3305 12219 6523 12999 9964 2004 17361 23759 21507 11984 4188 19754 13358 8027 3662 2411 19762 16017 9125 2393 4619 5452 24176 6586 10895 15872 1795 15801 6911 15300 14787 2584 4905 8833 1327 12862 9476 16768 12633 7400 11983 6276 18370 12939 12793 20048 20284 12949 21345 19545 4503 16017 1253 12068 18813

TABLE 1i (Rate 23/36) (n_(ldpc) = 64800) 2475 3722 16456 6081 4483 19474 20555 10558 4351 4052 20066 1547 5612 22269 11685 23297 19891 18996 21694 7927 19412 15951 288 15139 7767 3059 1455 12056 12721 7938 19334 3233 5711 6664 7486 17133 2931 20176 20158 9634 20002 13129 10015 13595 218 22642 9357 11999 22898 4446 8059 1913 22365 10039 15203 10305 22970 7928 16564 8402 9988 7039 10195 22389 5451 8731 19073 1005 18826 11109 13748 11891 21530 15924 21128 6841 11064 3240 11632 18386 22456 3963 14719 4244 4599 8098 7599 12862 5666 11543 9276 19923 19171 19591 6005 8623 22777 1255 20078 17064 13244 323 11349 6637 8611 6695 4750 20985 18144 5584 20309 6210 16745 10959 14284 2893 20916 10985 9664 9065 11703 17833 21598 22375 12890 10779 11241 13115 9222 21139 1217 15337 15514 12517 18953 11458 17296 8751 7213 12078 4994 4391 14976 3842 21548 10955 11679 16551 8514 17999 20557 16497 12122 23056 10551 20186 66 11038 22049 2130 1089 22093 9069 3470 8079 19208 22044 2732 1325 22309 967 22951 1366 11745 5556 6926 2805 18271 10046 4277 207 19518 17387 9701 8515 6813 10532 19714 21923 13493 1768 18819 6093 14086 13695 12781 9782 445 22160 15778 13629 10312 19769 8567 22096 15558 19730 11861 18492 10729 16847 273 4119 4392 11480 20396 3505 7220 390 5546 17277 8531 17390 22364 7167 2217 7325 3832 19899 21104 8400 3906 6218 20330 14943 14477 5614 1582 21534 14286 14624 14809 6775 22838 15786 6527 15848 5288 13523 9692 12696 15315 602 17081 6828 13578 3492 6510 20337 6113 5090 7290 20122 15539 19267 10412 19090 17863 2546 2295 19448 20296 2296 2627 6740 14224 10460 12878 6055 15452 15152 15699 563 15414 21900 19161 11126 15975 3733 4379 15742 6475 17203 5870 18537 4912 260 21115 23164 4273 1694 1082 5287 11152 14537 2277 19232 13414 15608 12926 17043 18241 18313 208 6118 20777 9140 19241 22845 18527 5035 4161 20867 22650 5585 7875 10358 1898 3563 14833 21329 14705 3359 13959 4507 11976 20017 22424 12925 8308 8739 15561 8010 6408 20723 20928 12337 7864 15777 12742 20430 17351 6259 1865 9808 8343 17441 2551 2167 3025 23181 22718 13243 4797 4223 4982 4395 1609 16748 17625 8463 15204 19632 6583 9112 20284 11334 19370 4763 746 18560 15222 8796 12725 15176 10245 15567 9991 17447 18373 21523 1473 5286 15793 17675 21170 6699 15515 15942 8733 7047 11348 14584 20435 19603 1961 18851 7069 11402 19180 6487 2979 2650 13282 9040 22613 23266 4786 20832 3001 23129 3850 5255 6601 19827 15438 13956 15798 4430 11318 4724 8719 21209 18127 844 21379 7427 22987 10233 22949 8145 21778 7622 14471 18874 8566 14340 3381 3373 419 11514 15127 917 13136 19375 18740 4951 960 2856 17804 662 8107 10298 10993 11755 19142 11400 18818 521 7210 18658 8285 9496 20836 5655 14654 13694 12705 20381 16473 7271 12796 3280 23370 13893 7667 1736 5485 18321 7789 11242 18771 17282 817 21060 15985 666 20461 22464 7696 19774 4324 12239 14014 4759 5011 10472 4137 3047 2444 3818 1594 20382 538 7051 21874 1697 18539 26 21487

TABLE 1j (Rate 25/36) (n_(ldpc) = 64800) 11863 9493 4143 12695 8706 170 4967 798 9856 6015 5125 12288 19567 18233 15430 1671 3787 10133 15709 7883 14260 17039 2066 12269 14620 7577 11525 19519 6181 3850 8893 272 12473 8857 12404 1136 19464 15113 12598 12147 4987 13843 12152 13241 1354 12339 4308 23 12677 11533 3187 11609 4740 14630 19630 14508 10946 3928 580 3526 17836 3786 15739 13991 1238 1071 6977 13222 13811 585 8154 2579 8314 12185 15876 7738 5691 12901 12576 11597 4893 17238 15556 8106 12472 10455 14530 17432 8373 12875 16582 14611 14267 15093 2405 9342 18326 12125 9257 5861 12284 2441 13280 2762 5076 17758 4359 6156 18961 13208 4400 8474 19629 19528 14125 12780 12740 19316 491 4761 1719 7270 6615 1175 15848 6943 18360 8905 13921 10807 19688 18757 8312 12234 17907 17254 7699 18399 5508 12215 4818 18107 2874 19496 13973 10432 13445 15320 13648 1501 10549 6710 8897 1998 1575 12713 10916 5316 13713 11318 4055 5782 5828 17981 3141 12177 10726 4244 3138 15996 6822 7495 5257 8909 6180 10680 6650 1909 19146 1038 17229 10050 3051 9793 10839 3532 14759 5337 8448 4939 14792 7585 17860 8612 2229 18965 1519 2031 13845 9320 579 15441 15050 752 8303 6989 13360 12927 15255 17286 3639 1733 16883 8457 9475 2939 3234 1993 8554 9939 6359 15474 12100 6992 13844 16988 7481 16977 9052 9262 15270 7181 3624 3814 16379 182 4338 17627 3315 5745 14093 15574 10709 18662 6909 11248 5268 412 5854 16782 16059 10498 5061 13321 617 6734 3718 15441 19241 17214 1682 18641 18646 6330 7377 16951 14477 6507 9922 11464 2563 5702 12691 10606 17874 7198 12571 17617 4862 18899 7100 8130 9665 10779 6789 11459 17651 3693 13332 3854 7737 12589 15189 16260 14569 9442 17890 18097 6845 6960 1376 8099 12719 14986 18999 14013 3449 13618 14807 265 1508 11231 966 15957 8315 3384 2570 5700 10911 17372 153 8445 19598 7841 14806 54 2492 14099 11718 18608 4278 333 59 3982 16986 3494 12496 2775 18320 10650 16234 9739 16537 19706 7587 19072 18775 14133 12042 2922 229 17958 15889 5130 11029 271 5122 7021 7067 12258 16611 9245 15493 15347 15939 741 12055 2822 12804 3480 5690 18598 19273 16354 2569 16771 13693 15051 853 956 12256 2756 15137 15685 2802 16479 14687 12470 3583 15473 17781 867 4843 6765 13122 11287 3680 19101 4609 11385 13470 12353 6632 206 10984 3116 1263 9419 14455 19438 9528 1808 435 2238 12870 10119 10868 8402 11111 11081 7197 2667 13780 10759 19722 3768 3052 1836 446 1642 12388 16876 8398 14485 7301 14815 13811 5678 10419 14396 1877 14384 12817 19028 19589 6893 8725 6346 676 13611 12486 2054 11203 14908 14692 18139 5334 1253 16233 9749 16946 18885 4332 16306 3862 10395 13871 3747 8900 3381 13367 14132 7220 15095 4219 15869 13519 18079 17541 19012 13943 19471 2221 5710 13711 5185 3363 10195 9580 17331 15360 14387 7596 9614 17336 6371 6030 14629 10636 10159 2402 9170 4321 1040 5899 153 7710 7637 13966 10919 8535 3791 1968 2567 4986 4166 8744 17691 540 10695 10019 17710 1188 10821 5858 17012 17389 3083 17587 12682 5354 9537 6807 4964 15942 9653 9000 17053 13291 11685 8503 10777 13919 18155 9877 1625 15314 13879 18520 7074 17061 3748 2752 7298 493 19163 14139 2260 18339 10688 8928 17695 10276 7640 18547 3561 11275 5297 13167 19691 19542 15725 11837 7273 11297 17873 7840 19563 8109 3811 18417 17759 17623 13175 10041 4152 2249 18452 1450 19309 9161 11651 4614 11547 14058 639 9384 3272 12368 5898 2578 14635 15963 6733 11048

TABLE 1k (Rate 13/18) (n_(ldpc) = 64800) 2510 12817 11890 13009 5343 1775 10496 13302 13348 17880 6766 16330 2412 7944 2483 7602 12482 6942 3070 9231 16410 1766 1240 10046 12091 14475 7003 202 7733 11237 15562 4695 13931 17100 11102 770 3848 4216 7132 10929 16469 17153 8177 8723 12861 15948 2251 1500 11526 8590 14813 3505 12654 1079 11736 6290 2299 17073 6330 5997 390 16492 13989 1320 14600 7061 6583 458 894 1596 8625 7644 1322 16647 15763 10439 8740 5529 2969 13893 13425 13121 5344 8739 4953 7654 17848 9334 9533 2731 12506 10992 8762 5395 6424 11688 3193 17601 14679 8204 5466 15487 1642 6671 13557 4074 7182 4436 12398 12973 1958 13041 6579 15984 3762 16633 6113 11509 7227 28 17202 4813 14024 15099 2648 4476 2260 6507 9930 9232 14186 14510 6818 7665 12708 2645 16687 13255 8239 15884 1751 7847 17987 11410 3345 17133 17655 5027 1261 17191 8056 4264 13915 8217 6118 8072 6278 6835 5038 15008 13625 2999 5336 11687 13500 5723 13903 766 6293 155 12316 14093 7372 16846 15357 9865 17869 1429 16681 202 15062 1123 6454 17625 3213 39 1669 1770 13636 16555 13053 7597 11481 1336 3343 11387 5463 17830 13741 5976 1956 13509 1664 16867 8168 13421 17078 3285 17138 1572 16711 1499 4805 13584 14759 2844 13110 7356 5850 8330 6521 8528 14170 6681 16992 12867 14326 15227 4082 8595 16176 8184 8572 1923 935 8900 13020 6812 9778 3391 3946 4711 15314 15108 15634 4144 4372 9207 10715 1291 16601 5864 10968 4724 9235 6988 3307 6515 7004 16328 16217 4227 9735 15857 5003 2532 4451 8574 2149 6908 9506 8949 12035 9701 3124 14295 8567 13614 5159 16746 2418 8669 10921 5738 147 1004 2692 9065 12877 7559 16706 8511 10314 3118 1219 7071 12376 538 2389 3297 12492 10589 5791 13528 1653 6618 10485 1307 4102 347 13580 4039 523 10311 10540 4183 6192 17159 11458 6521 9632 11594 15791 10384 11654 126 11715 6265 34 5091 7271 13900 7588 3960 11297 1612 9857 4695 16399 6423 2197 15040 4219 5979 13959 2959 578 8404 4585 658 6474 15900 11357 5249 7414 8642 1151 4130 9064 14537 14517 1356 3748 13865 12085 17295 9530 5110 1570 10862 8458 15322 16355 1774 5270 1229 11587 1632 17039 787 4703 11423 15388 6136 8413 9703 13946 4678 4072 16702 6244 4690 7164 7238 14169 5398 8679 122 11593 10954 15802 16427 9413 6717 16406 1027 17863 7836 655 8827 10286 4124 12599 12482 12955 3121 15318 8343 16634 6301 13568 5056 9920 1948 10 17395 8550 131 2151 15226 15994 13093 10966 15412 2781 13425 15831 5346 2261 1067 6346 6625 1966 13533 10575 4483 5761 14366 2019 14426 16746 1450 4830 13109 7358 7942 15376 7284 14035 14341 12625 3306 9375 7529 1537 13831 13447 4549 15658 15299 8238 4005 13264 9766 4715 6285 15383 1262 12883 15434 11123 14975 3434 5307 1112 16967 12163 12009 3681 9174 13153 10344 13456 13197 9562 1785 7549 15347 663 9748 9436 4961 11903 11574 16248 6238 666 11426 13748 14763 14431 1443 2069 2376 8154 14978 13140 1289 9046 1159 300 3319 11510 7769 15877 6430 14946 6856 8868 15622 12458 4867 6622 6850 14721 11241 12760 14233 9874 17682 16677 13195 15086 11155 7067 14160 12741 14379 8922 1930 17055 11752 12361 6523 9568 12165 5636 16011 11389 4754 9916 15903 15542 8301 12073 4918 9754 16544 17907 14814 10839 1401 5107 12320 1095 8592 15088 6521 12015 14802 3901 8920 17932 2990 1643 5102 3870 2045 540 2643 2287 5844 2482 9471 10428 637 3629 8814 7277 2678

TABLE 1l (Rate 7/9) (n_(ldpc) = 64800) 13057 12620 2789 3553 6763 8329 3333 7822 10490 13943 4101 2556 658 11386 2242 7249 5935 2148 5291 11992 3222 2957 6454 3343 93 1205 12706 11406 9017 7834 5358 13700 14295 4152 6287 4249 6958 2768 8087 1759 11889 4474 3925 4004 14392 8923 6962 4822 6719 5436 1905 10228 5059 4892 12448 26 12891 10607 12210 10424 8368 10667 9045 7694 13097 3555 4831 411 8539 6527 12753 11530 4960 6647 13969 3556 9997 7898 2134 9931 3749 4305 11242 10410 9125 9075 9916 12370 8720 6056 8128 5425 979 3421 5660 9473 4348 11979 5985 395 11255 13878 7797 4962 13519 13323 7596 5520 2852 8519 3022 9432 3564 9467 8569 12235 11837 5031 4246 2 4081 3630 1619 2525 3773 11491 14076 9834 3618 2008 4694 6948 7684 9642 5970 1679 13207 12368 262 7401 11471 2861 5620 4754 7474 10418 1422 10960 13852 988 13465 6415 86 2432 7595 12239 8539 11749 8794 6350 1947 13325 13061 7385 13017 2536 13121 15 7944 13831 5126 9938 11758 335 980 9736 12143 5753 4533 10814 10706 12618 6949 2684 4107 14388 11372 6321 13832 9190 2838 13860 10830 1947 13803 3257 2677 406 8400 10536 12911 3629 251 9784 13343 13304 301 801 6456 6351 6155 6763 3812 11337 8446 9306 524 5573 503 10544 8990 673 2309 12376 466 11441 960 1557 4403 3564 1732 13453 12054 8941 1383 12424 4347 9830 3553 5158 2025 4282 4983 13553 10776 11833 13099 5078 4420 3527 1544 7474 2780 7749 4153 11189 520 8463 12230 7712 10409 13367 2604 2966 9248 1412 420 3507 9818 7955 1122 12483 9375 10232 9456 2799 7033 10404 4495 12059 2569 5970 6262 2199 8045 11724 511 12693 12855 9597 756 12900 13391 13623 10683 2095 13479 1488 9469 11142 13849 1356 10776 3530 9866 13449 14225 2072 12772 9461 6466 6181 6502 401 7439 4631 1086 3062 11789 11811 6788 14007 2270 14132 2764 4643 10272 11316 2608 8511 5221 9028 2736 7223 1051 1974 2737 6739 13904 6156 5 9082 3915 2400 7195 3413 606 221 8171 4548 1267 5310 12795 2160 8305 10563 3507 12190 6325 2499 9717 9251 6046 13308 11704 10834 11241 4777 3774 11533 12487 10365 6852 58 2650 2027 7248 13704 5573 12777 7834 8561 7906 8121 7774 554 3105 6000 11198 3586 10410 9002 4094 11297 12058 1037 13638 1258 12917 11078 2430 51 10276 7841 9451 10236 11045 1058 10352 9629 9428 86 8146 1255 3802 10820 6337 4199 9364 7723 1139 438 6445 583 2683 5358 10730 8471 3061 13380 3005 2840 4754 8210 1814 11502 8667 14258 5985 8407 13336 10970 6363 11715 5053 104 13618 13817 6562 4087 294 1742 10528 4626 6607 2692 1587 11097 8361 2788 13451 3541 823 4060 13604 9816 157 6106 1062 8853 5159 4270 9352 13164 2919 7526 5174 12501 12634 13077 5129 5750 1568 6281 269 5985 10973 8518 9415 1028 4722 13275 634 12113 7104 7436 12787 1032 5936 3425 11526 10797 784 9208 15 11223 12849 4913 10635 3553 8852 11749 10619 3532 4080 9831 9219 6560 6049 6111 1304 11770 12585 13209 8589 11287 2887 10699 14307 4752 456 4073 1175 13156 4894 12756 3237 6279 10125 7074 2344 7533 7103 5226 4000 4425 12173 10056 5312 1599 7445 8696 12533 11509 14050 2483 12405 2876 5033 4512 4955 5627 5572 5099 10987 10665 404 3082 2075 1583 13454 5666 7228 524 13290 7634 418 9006 7368 4181 9447 3674 8171 9355 10211 9342 12572 3681 3322 3295 186 7491 7926 212 5241 5479 1654 8097 5078 423 4817 1357 12780 3664 11900 402 13108 299 7166 12008 5750 3041 5618 8357 1229 8884 3713 8791 13375 4390 6302 568 1009 4440 10003 1209 11978 11711 1803 9838 13537 11318 9750 12421 2388 3021 7880 7220 1062 6871

TABLE 1m (Rate 31/36) (n_(ldpc) = 64800) 8971 1759 4661 2344 8810 3677 5653 5575 7855 8916 1232 6045 3232 8535 7071 6764 5731 2016 8662 3813 223 4080 3502 3358 2640 7181 793 289 4907 6380 6437 261 7395 3264 6823 551 107 3672 245 2133 2328 2462 2349 1096 4755 5134 5661 5948 3017 7071 6140 2620 4479 5669 508 5209 2522 3677 7033 4553 4780 8149 6346 4190 5242 3118 8430 2284 8323 3944 7479 7765 7974 3145 4381 47 3257 584 8668 3622 7087 6946 4527 5274 6111 4151 1805 3370 3713 3710 186 758 1606 8866 2975 3305 6548 2039 2197 4021 661 7382 3627 628 8334 4880 2742 5139 1910 5450 6338 8246 8710 8382 2952 3468 4905 3623 6578 2519 8966 1781 4964 623 4641 7520 6371 6835 1853 8584 3351 7486 7368 1500 5916 5328 2390 7684 8660 4286 7833 8517 3696 8199 4143 538 3959 8390 3414 8353 5244 5698 1645 3804 2158 1979 10 8920 6848 434 4640 3443 4662 3311 8682 4678 5773 8736 4743 7365 213 3257 1449 7394 7035 356 7916 2503 7790 8719 7879 4639 4251 1160 542 8333 3163 713 304 1515 3019 5747 7901 581 857 7416 6967 4325 1224 8200 817 7526 3694 1563 5341 4464 1668 4154 2731 5150 3051 3027 4312 8372 8168 2438 6549 1669 2508 792 5112 6776 1508 8775 1199 2766 456 4827 7450 6774 4851 6529 3650 1777 4738 4717 6245 427 5897 956 7912 829 3876 5237 7972 6664 7929 8937 8392 7322 6575 7176 1446 4850 5066 8804 8899 8400 3469 6998 3642 3011 7923 4486 1765 6452 3059 5714 788 2207 3170 7267 1301 4997 4439 5972 2812 1780 6970 1589 7959 8278 6071 4534 3352 97 8471 2786 2155 2310 981 4507 7595 8390 1576 903 4985 906 4329 6038 3816 6655 3181 8643 462 6342 369 7927 5468 4640 5158 5099 8728 1162 1013 1668 4991 10 4023 7683 2169 5932 4904 1508 8599 81 7255 1696 4953 2574 3819 8670 4354 5201 3245 8547 2582 8283 5948 112 0 3555 8320 7361 3833 6990 2073 8147 3267 443 5558 422 4028 6204 3714 3204 1319 5834 385 2462 1221 7359 5931 8590 8507 6028 1036 6649 411 8848 2741 8385 2 734 5600 5141 6463 8874 5635 7438 4542 4355 8441 7926 3737 106 6421 5843 4827 1068 8169 4377 6957 13 3539 1226 175 8814 7140 3442 5985 8721 8564 6126 3850 8168 7291 8950 3881 1495 7555 8118 5993 6269 2364 6839 185 4721 8226 3508 5415 7558 6282 5985 8472 2791 4386 6780 6798 2965 6375 8983 3049 7644 5774 6057 8856 1119 6354 8565 6181 1611 8078 3236 6834 5834 2671 1352 3780 2609 3762 2341 1778 6913 523 2420 1779 6462 8692 4898 3367 3526 2137 1829 1013 953 6042 4363 347 7052 5170 5807 5302 2622 4624 8309 4278 3905 7431 3576 391 6 2284 6866 624 7584 7746 3739 5085 2171 7148 1787 5217 7011 3901 8124 6487 2318 1527 8208 889 7568 4516 1340 1403 7681 680 8128 3502 8037 5595 6254 6343 455 3114 8126 6908 1370 3185 1047 4035 8017 2815 7533 1663 2346 4345 238 3292 527 7323 8811 7598 2211 5857 949 554 7169 8797 1600 869 1269 3815 4457 4850 3857 3079 4500 4413 7547 2532 250 46 3357 7128 442 1828 1156 566 7441 603 6927 7801 2986 3767 1008 5843 4822 979 1910 262 7958 721 2898 3835 1141 3693 1448 4271 394 4379 4286 422 2275 2026 4383 4840 7098 8809 742 129 7220 550 7440 6138 4257 7627 3234 8724 7147 631 2669 680 3924 6213 3684 935 2781 3219 8705 4977 2276 6690 8586 4945 8664 7205 5893 7264 6887 1064 6249 3962 7938 4495

TABLE 1n (Rate 2/9) (n_(ldpc) = 16200) 1412 2138 8984 3438 2515 10585 11093 5801 2511 2287 10879 10470 10973 3691 11847 4141 479 7406 3228 8356 256 11769 2480 8892 9040 4517 2672 11159 7865 6415 2638 5399 7575 952 3128 12126 6408 60 10782 10254 11866 4473 10592 8736 3819 669 2091 5790 5040 6987 1353 2734 9859 3974 12568 5396 3717 6005 5830 9748 7221 8759 396 2259 11357 5702 7043 1281 6308 11899 7792 6476 3741 11099 6895 3224 1940 8224 8533 607 5065 9226 7677 389 7233 11605 7002 1302 10984 3435 9186 5964 7806 1613 11451 6020 5275 4965 6307 6942 1054 2451 5545 10447 6453 6583 6177 6284 11747 11323 2696 5058 3217 6755 1434 3691 8784 11507 1298 1233 7964 8103 6761 11865 1288 4258 7960 6753 4896 3722 3526 6795 4663 2198 9374 8700 9195 9272 7573 6956 3057 10801 574 9292 525 989 7701 3754 1110 330 3367 10472 6202 2627 1181 11223 3564 1628 8362 6419 7476 10074 1406 12509 9757 10380 9841 100 10177 8331 6788 8872 11167 2167 3646 2770 3111 8679 9590 9338 9119 8373 90 10418 12041 7718 3102 8551 6068 8424 10522 8595 6512 866 4591 3390 7496 172 1467 9023 9000 4113 9407 7168 29 11625 8584 8396 9683 1457 6097 9254 1850 12476 11664 11115 4278 11945 844 9302 7661 12225 1040 3671 5318 4875 3554 10478 10902 11739 3429 7114 5533 3709 689 2951 10126 10677 8709 9880 1112 681 6786 2945 8823 210 689 6648 509 2228 11109 10495 8746 8223 4337 6804 371 5245 7435 8110 6001 11003 5097 2116 3826 2054 5220 7231 3029 5134 8970 132 9603 1538 10743 262 11188 990 6782 3283

TABLE 1o (Rate 13/45) (n_(ldpc) = 16200) 7200 3499 6246 3905 247 2945 6706 2366 4892 5254 3370 7202 8203 6971 5728 4002 9544 5247 5176 5021 6732 8016 5317 9111 11144 7046 7808 8792 9779 11402 10050 7970 2047 6746 746 11319 4085 9903 3751 10712 6662 10504 7149 8084 7417 4334 9448 10678 9739 3412 2152 1114 6077 1021 10761 5073 3458 10115 4722 2581 8860 1515 1997 8926 471 2708 1449 158 4140 10611 10740 9693 3165 10132 4839 4204 10917 2320 6112 867 4929 9201 1707 10355 10887 7531 1123 8118 8896 5168 2011 110 9188 8375 9421 1693 1252 5132 10342 3726 2094 761 7397 10962 1848 4584 7139 1858 10499 3638 4924 1466 4191 2999 7778 11389 1071 2537 9265 5340 11498 4140 6795 3575 7332 10491 1502 3493 2380 3962 5169 2719 6028 10291 3440 7669 10253 8175 9134 2374 10199 2229 1055 5597 6655 7533 1518 11299 3033 1083 2464 10032 10910 3439 11511 3763 1424 9362 3170 10113 5492 11354 3160 10592 10897 37 334 8974 8540 9590 4255 5342 6469 11153 2925 3384 8958 7809 8108 2721 388 280 3829 8071 7567 10280 8151 22 8789 256 6937 5050 10795 1844 7999 1047 8549 4046 1696 893 8952 9610 10014 6772 485 9159 11346 10133 4447 10089 9419 7756 2637 6446 11400 9357 9302 2726 1559 7231 9930 9385 7889 2356 11066 14 1180 8283 458 5862 5540 3284 7878 9379 4637 11123 7791 8965 10476 2620 2593 4749 1747 4818 10173 596 9833 4518 5205 2808 592 228 10538 5907 164 2111 6334 1930 7625 11378 1531 3798 8978 4224 10183 8729 2755 10694 4801 2302 2649 1977 10031 3495 4789 1102 760 9858 700 3625 8633 3152 6230 9510 6123 2053 10767 50 1777 10548 6803 3935 1861 220 3117 211 7402 7164 5909 10691 4175 4997 7823 830 6156 5451 11467 1346 2838 5962 2858 10343 905 3219 1146 584 10896 5474 5315 3529 5378 4164 3155 9405 11386 10011 9288 7404 1200 8828 649 9557 9284 11419 7104 6268 918 3637 11395 5539 4612 4850 1965 8574 7497 8644 857 2038 10674 10465 886 10864 7119 353 9657 3090 7792 408 26 5892 4193 3663 10393 11181 5241 2721 10010 3240 7704 9370 8872 9280

TABLE 1p (Rate 11/20) (n_(ldpc) = 16200) 4692 1824 629 6885 466 5885 1190 3308 7241 3690 4845 4383 7107 5761 3200 4648 2401 6747 4908 1777 796 6724 1310 2462 3313 5669 6966 7054 6004 4230 1509 1194 4523 4356 1438 7261 5516 3549 4934 4308 7052 3603 6516 945 3511 617 5820 4168 5622 4545 1242 4382 1781 3490 4461 2464 6762 4082 2975 6166 894 1316 5228 5057 4644 5319 784 7037 3831 3570 853 1703 5064 1011 1642 6895 863 4176 1115 5811 4326 4263 2325 2685 223 6496 669 571 5057 1096 3594 7208 3140 3336 992 3516 4296 4492 5796 1875 3068 4970 6802 2652 214 6831 3611 2470 846 640 2983 2208 5295 5924 5242 5747 3017 1208 974 4819 2163 1631 1198 4570 2983 3664 2253 6131 4672 4698 3272 3537 4532 346 4936 5696 1275 6386 2124 7138 1179 4236 5891 3688 3376 6079 2437 4585 6404 1101 2289 378 6773 2800 2195 5013 3121 6579 5086 4192 3925 6844 4327 6329 6075 2738 6941 4088 4631 5613 2332 1432 5655 2516 5657 5383 3494 1235 3237 3282 449 1982 4339 6071 3262 5233 7004 390 2526 4128 3762 1284 4669 5897 6506 5840 2240 5046 1769 2539 6637 5000 4013 2325 1798 4680 6318 6746 5262 215 6980 2436 6086 1764 4227 4273 3163 2663 2406 2037 2549 649 4346 2391 420 3069 4930 6338 1834 6713 7013 1483 1918 2122 4147 1365 240 6277 6965 2436 2263 1334 2766 3525 5125 5808 4540 270 479 6244 2162 1409 7159 621 1439 4703 6526 6147 2701 7284 5510 558 3472 4520 7268 6903 4942 2301 4603 3451 512 3982 1219 30 2433 3797 469 4999 1845 6340 2327 1127 4663 6218 2112 4826 4851 1442 312 4788 5715 2449 2205 5056 1293 3985 1505 5768 5534 2604 6887 1831 1693 3557 5558 4425 3317 908 6236 5087 2257 3043 7159 3988 4837 4823 2208 908 6145 7232 1654 5099 5820 154 5058 3816 5710 5209 4080 5824 3820 7136 7066 6226 4999 4818 3081 1008 2378 3443 4210 525 3330 6183 1159 5073 5340 5786 3287 325 590 4048 4667 2821 4634 4645 2287 6592 580 4814 4375 4460 1799 160 2686 372 2129 5124 2066 1088 5047 995 226 5085 6263 2380 6679 3460 3011 3728 368 2642 365 3253 3801 2032 824 3243 4488 7088 6069 1002 1830 5718 3944 5213 7126 4207 5638 5780 1663 1081 1969 7238 1671 188 6826 499 5878 4110 393 2845 3816 3302 3755 2810 3055 5876 4890 3663 4288 2134 2926 2633 964 5454 2540 4811 2737 7149 2494 3042 7140 3546 376 4567 5871 4351 797 4245 7178 6811 6722 1351 5102 7241 6537 6828 1345 266 3094 2749 3658 5328 2573 1454 6444 5267 4847 1407 1305 6597 665 860 1934 6150 4115 3799 4362 4407 6956 6703 1355 2152 943 3688 6536 1737 1856 3374 6987 2896 3414 4897 1339 3530 6599 2011 6911 4907 4542 3723 4374 1444 3344 568 4887 4732 6402 1609 4422 2809 2306 570 3063 4645 2697 5994 505 5805 1353 74 6648 1738 725 4900 1614 5497 841 649 731 3474 4246 1530 6986 2023 4976 259 6173 987 5313 2276 3770 4029 5101 4900 3767 6863 3991 2090 6639 1708 6603 328 1674 1476 3494 1497 3083 5233 4103 6677 2522 6812 6404 25 1986 409 2739 1882 3534 1958 861 7072 1958 2364 5609

TABLE 1q (Rate 23/36) (n_(ldpc) = 16200) 4626 1140 3468 5725 2133 2303 473 1009 822 4351 2620 4725 4712 5060 4753 2897 5002 147 236 1234 4181 103 3305 947 2893 3155 3944 5064 1931 2538 3341 4027 4268 5630 671 2963 4446 1161 4388 5381 4986 5105 5817 4928 4420 3543 3452 5455 4711 3255 1654 2549 2963 1256 2235 1127 171 2482 1282 75 1645 2833 5326 2386 4508 4547 3789 1497 5124 2650 2370 4577 1421 962 2986 1788 4993 5240 1659 1071 980 4674 2477 5373 5719 1828 3904 5050 2516 58 4982 5550 5600 3411 1568 3674 2916 4767 5114 3143 4289 2589 1305 4489 1050 5696 1860 2030 4584 1514 4425 3025 5051 5435 5675 2726 81 5031 193 4032 3282 228 392 4389 2396 5698 5563 4218 1740 4605 714 5520 3616 5534 1115 2065 1267 128 2019 5820 791 4558 5700 4883 2655 2903 2269 4669 367 3392 3845 1937 581 928 713 4773 2637 1195 2941 3974 2614 2251 2311 3724 357 5847 1614 543 1039 4426 2821 3108 2323 224 4424 622 4731 2476 5740 1002 5065 4869 1384 50 5035 825 1302 2500 214 5711 4191 4268 5218 3679 1327 4629 921 1368 2672 429 4639 1916 4278 3126 3440 50 3976 5237 4865 2990 911 1768 4500 992 4704 5171 1737 4858 244 5647 4413 3838 930 1764 1832 4028 4958 4098 1522 1326 701 432 63 5603 3397 4963 3719 1757 545 3634 2417 51 476 3169 1744 2751 3068 2754 5788 435 502 3431 5141 217 5343 2096 1154 5301 5455 1306 5538 1821 3787 3714 805 967 4366 40 5228 624 3319 4013 4113 2110 1412 4137 2376 5135 3884 4890 512 5327 5807 2441 3652 5512 3623 1827 1019 1357 2629 2039 4047 4608 152 1129 634 4708 5165 4941 3432 1682 2583 437 4956 989 3149 2444 5476 5063 3147 93 2652 2694 3510 3484 5215 3576 5330 1214 1301 4752 2544 665 1669 3425 3851 917 1677 1696 4385 3184 5716 2684 416 1587 5466 5117 807 402 1819 684 2619 1271 5820 1818 1010 3901 2373 3739 4706 823 3718 3738 565 5476 4945 1396 4745 4776 2784 1079 918 677 3991 5626 3195 2401 1007 3257 1378 5770 2213 4972 2611 2515 4883 4015 4442 3965 5844 448 4852 2035 3579 1090 4495 2482 3385 2415 5603 3036 2307 2416 4994 4832 4212 380 38 2773 2057 1308 436 2291 924 3045 3575 3084 4507 4803 3768 1673 118 4804 3762 2931 4736 5619 1357 2531 3547 1153 343 2676 3784 1810 4515 2576 348 1551 2939 4088 834 5396 1260 3465 1734 803 907 2471 257 1523 1632 3775 2968 5100 166 4352 962 1869 5173 47 4415 5040 782 2449 1611 2239 4649 1664 4422 4211 4708 5777 5762 2579 4418 609 3241 5088 3031 4033 5306 3404 2633 3330 4899 3679 2287 584 5181 4162 3310 1783 2487 2229 334 5507 508 5296 5348 4143 1902 4200 3938 2790 5150 5834 4250 4392 5223 5221 1662 2779 170 2942 116 2334 134 4175 1970 1114 4668 2250 3336 393 1764 3709 5156 3925

TABLE 1r (Rate 25/36) (n_(ldpc) = 16200) 3717 2086 2490 983 835 4687 4347 4476 3404 1761 576 4145 578 368 2845 3005 909 364 3235 3961 4076 512 936 592 765 2964 746 1927 4924 2903 3317 3261 1270 4535 4082 4236 1298 2632 3931 2365 4093 4275 1695 2374 428 2881 2308 1623 277 3560 3583 2093 2563 3756 2174 186 101 1014 1629 496 1763 2714 3520 1193 243 2712 2503 1332 1039 3201 3305 4587 3408 433 267 4567 3310 3949 1938 280 3951 4404 4528 4292 2791 2944 1533 1437 274 1965 2557 4701 2488 858 3540 2134 342 4890 2891 1947 1353 2021 1422 388 3045 605 2847 4059 1204 3680 1505 2758 3764 1874 2296 4804 337 2581 1810 2235 3623 3387 484 262 177 3981 2578 3711 215 4569 3281 572 949 2395 1082 1689 2912 45 2900 4391 1219 3966 3939 1521 3156 557 2258 1247 4471 1347 349 1683 4762 2854 1469 1924 3164 1079 1270 4828 2363 2104 1792 22 3231 2775 2423 3177 2287 2571 2530 3480 374 4526 4713 4760 3606 1798 2371 2510 4392 2655 3731 635 1264 4808 586 1530 3539 4714 4507 3826 4767 4887 750 3153 2851 2381 3547 3114 4280 4442 4710 4773 3920 4356 2976 1155 1394 9 2545 879 4188 4150 69 1372 3483 1347 2676 698 2922 2547 4926 391 2998 2896 3684 92 470 884 3186 3751 999 2259 575 4155 2053 337 353 3449 65 2292 726 4700 4012 3049 3508 1443 2438 132 3100 4427 2810 2208 3640 1993 4029 3104 3956 3298 1291 9 2926 39 1053 3365 1223 344 4142 3983 1564 3438 271 3187 2143 1179 1422 4808 4103 4814 3081 1550 2594 679 3404 344 1749 1011 449 4522 3490 2052 757 2508 2035 3087 2578 2330 3765 883 3322 3949 2156 1486 1230 4166 4106 3157 3789 1804 4237 4644 4832 538 2571 1231 83 3391 968 620 3841 4072 430 3715 3034 3594 52 1688 1107 2451 2790 4493 3131 4635 3197 714 231 4226 2122 961 1094 1118 1540 1550 1283 940 3985 679 914 952 983 3030 868 353 562 4129 3178 1719 931 3248 659 378 122 3064 1132 446 86 2986 399 3004 1700 217 4511 4712 3852 3189 4715 3500 4823 2186 2221 1472 4220 4206 376 1077 602 1281 4257 1385 4528 1354 2730 2701 738 2008 3989 3825 302 664 995 3473 4540 2668 1663 2271 2465 2334 3551 4028 799 3523 3877 3738 3999 2832 2187 4404 597 1291 2382 1411 3478 831 1080 1720 460 2630 548 1359 3736 943 1813 396 3447 1040 55 1438 3007 2305 99 4399 2097 672 127 1972 2670 3843 2060 4500 2824 1088 3904 1646 3473 920 1832 3307 1885 891 370 3530 3988 1530 1622 3751 2515 4840 4819 532 2263 4213 1894 3241 2172 1720 1298 3976 780 3088 1683 4340 3075 2980 316 2455 1701 1106 2560 2811 151 2481 3157 1670 552 1329 3876 3378 1137 4060 37 1087 4074 2256 787 1840 4448 2800 3711 744 3710 4914 58 2171 2569 2173 1552 3975 4486 1025 2337 3313 1972 3531 1465 1836 3509 452 2216 2993 3440 3921 3059 1143 2621 1196 3864 2468 3362 4556 3153 3242 825 53 4058 1046 3814 550 169 1123 533 2467 4843 1523 64 3493 3882 2708 1378 647 3834 4460 1989 3734 1011 4453 847 3376 3723 1065 1964 4882 2409 3797 651 3980 4069 4291 1004 4321 4214 2961 4944 2277 1984 4617 3331 1022 1204 1943 992 1609 2287 438 2425 1553 1922 2389 2119 3996 574 2810 3813 2944 4546

TABLE 1s (Rate 13/18) (n_(ldpc) = 16200) 2192 1265 868 3272 569 2864 2608 666 2275 105 2140 2364 299 3944 3601 3720 588 2437 3256 823 1834 2010 1287 96 3400 491 1853 892 3359 202 1517 4347 1598 3895 686 2526 434 28 18 1702 582 3070 1123 1334 3288 1717 1954 3993 2483 2045 35 441 713 2921 3908 2027 3853 2180 1670 1473 2087 2054 3055 2764 1440 2563 1192 2573 3322 4436 4435 1417 1879 1661 1555 2334 1473 2207 4190 172 2640 4281 2091 3492 2509 339 3293 105 3822 445 1170 1350 1994 2696 3867 4048 3816 845 3661 1841 3485 3973 522 4150 3497 1752 284 387 2392 2776 1116 3378 1486 1249 4354 1539 2944 93 1914 1602 2903 3143 3574 179 1280 149 2558 2450 1120 4418 1355 3730 570 4107 4422 4406 1492 4313 4415 2767 1547 4305 1658 1693 289 654 3281 3159 1076 798 3801 1160 462 1419 3371 924 3575 2427 232 4083 1375 29 2364 2909 2843 3668 432 2488 183 4498 752 84 663 3968 1901 2766 2056 1497 1087 3498 4169 933 2713 3947 2418 1075 685 99 1010 1144 851 4150 2141 48 2111 4190 3875 1906 2883 794 2357 662 2065 971 3174 3127 3428 2481 3696 1816 3712 1751 3777 3381 3107 486 2649 3947 4335 1971 401 1539 3940 3111 3506 2088 1113 91 2769 1509 888 1769 960 2853 2485 433 2329 4489 3907 4394 2800 2226 3816 1352 4429 2481 1632 2459 3107 317 2662 1465 624 2078 980 2296 714 3758 838 4479 3212 3165 160 2037 3445 4296 626 2678 254 2577 1510 4195 2262 4158 3656 4026 2203 3427 199 3904 361 471 3274 930 1932 4386 2789 1078 475 2319 1903 1961 3515 1121 1374 3930 3231 1782 36 3846 3586 4292 1220 3459 1843 4285 2959 3197 737 1475 2767 3284 2071 4248 1601 1692 3935 783 1613 4030 3217 3574 4439 2783 1366 1849 1685 3923 2519 2224 559 1215 663 2654 2213 1720 2642 4206 253 3869 2100 1908 738 1269 2067 1314 3511 4104 251 3250 1429 1997 557 2622 2684 4196 3297 4162 1270 3774 4377 1188 1614 178 910 3254 1707 4401 684 1006 1808 933 160 73 4031 2416 131 3480 3545 661 3762 1057 3179 999 1545 4068 352 4394 2240 3846 794 4489 505 1749 781 1561 3982 1960 2888 3246 2468 1277 3752 2091 964 4143 1702 2300 2330 505 3566 4190 1808 2698 2173 4106 1144 1822 4295 462 3187 793 175 3276 415 3371 1725 4436 1079 3227 4428 2968 1471 1103 926 3455 2826 2803 2122 1078 3315 640 387 182 3191 1486 4489 4282 2241 3748 589 4076 2164 567 677 490 3887 2508 1393 764 577 3086 2108 2784 1762 1281 601 460 3810 429 4396 3043 125 1429 1028 3836 2717 3938 279 2184 4248 466 1653 3827 2192 889 1522 2435 3058 3583 1619 2134 3857 3089 814 301 4380 320 1628 3244 3490 1838 2136 632 4093 3101 1319 3738 1154 1331 1965 2897 3650 4390 3487 1768 2578 1487 3465 665 4350 1083 2935 2974 1354 2782 1726 2041 292 2848 4068 118 2581 3525 1283 691 2946 2957 21 1450 3182 1709 2373 1320 2098 3911 1752 2805 2426 2356 2885 3662 175 1446 3774 709 2773 1345 1704 963 912 3353 4220 16 599 463 3105 3157 41 4244 3244 72 410 455 2849 1847 1197 174 4056 2745 1903 1271 171 3511 3072 395 4469 892 2567 2413 1956 2430 1349 4352 2561 1030 2 1809 3416 3973

TABLE 1t (Rate 19/36) (n_(ldpc) = 16200) 1282 5463 2055 1492 6457 6767 3505 1482 1439 6574 60 2796 3840 1600 3301 4638 7064 6019 1981 620 1585 6357 6215 2923 5347 1877 1546 5034 3058 1839 4485 7647 5859 1883 424 2650 5559 1779 574 4934 42 765 2647 3586 4426 4731 1714 2322 3561 5920 4388 5319 217 1430 6897 3410 5416 6595 7285 130 2164 141 7069 6618 2274 2510 5625 1070 6638 6664 3156 6564 7425 3088 3992 7531 1469 2669 763 7347 3322 5053 4922 5014 3202 627 991 1165 3897 6116 7469 1315 4928 1483 1555 2699 2262 2815 2251 1615 6892 6023 1882 4243 3593 3012 3144 1914 6929 3722 3145 3032 3864 4084 1371 657 4019 4635 5898 1009 5077 1866 4950 3746 2553 5393 5486 5144 207 1921 5618 7390 7155 464 494 5977 144 4421 2752 5922 1530 481 3468 321 5883 199 3099 2896 3951 4141 6906 3162 3695 3899 2980 2973 4003 3742 3750 7130 6877 839 2928 2543 5169 5148 2056 41 2080 2599 2722 2416 3253 3228 5591 6946 2811 222 1503 1297 4977 2500 5383 1994 5541 298 3762 2433 1419 5906 237 494 6274 3527 2583 5711 4866 4231 3453 365 2829 5364 6965 3810 4376 885 826 4987 5634 3645 5630 3278 6526 7357 7587 5871 163 4849 1441 4931 5085 1060 6817 906 3155 7471 7393 424 7341 4823 6053 991 7013 7624 2416 4062 3427 6316 7269 947 6047 326 2745 402 6140 4286 2383 6100 6343 5747 1647 5145 2211 3555 4423 5854 3333 6933 3469 594 1374 1127 5235 3114 3804 2214 6081 757 124 2885 2678 3407 2159 2007 5604 2084 2605 4435 3893 1119 5601 4518 1252 5314 7546 5244 2570 1794 6227 4193 3178 2890 4720 5205 2902 3488 5583 3873 5066 967 1809 3834 2284 2649 3798 1431 7547 4545 7423 3136 1389 3355 1919 879 7098 7396 3276 1101 5577 6466 243 6253 7271 1017 3678 2005 2227 1249 6514 7267 2076 4668 4521 7170 2955 1293 741 4839 5039 2957 2363 5604 3846 1306 753 604 2017 2464 6487 2840 7272 6063 7068 42 113 1406 1468 2423 181 1942 5402 4675 1733 1596 5823 3523 1958 994 3816 5818 1244 4898 6341 7032 5426 1432 326 5651 3397 5072 2443 2461 4560 2472 3758 3050 2297 5776 6071 1640 3546 4878 5368 2438 1294 6553 5618 5324 5595 4194 3383 5457 2707 1713 932 3538 1262 5996 6778 1405 6942 3091 4905 6802 3748 5126 4580 243 3252 5151 7106 3489 5405 5216 2129 5194 4300 5641 1046 6143 3885 2161 864 791 6392 1100 5526 2661 4948 6150 925 3893 3038 4340 7175 5967 7475 3905 7246 2988 5017 7236 2542 4959 4592 2020 4870 6237 5239 515 2569 6152 7596 1508 600 2636 5149 3379 969 5263 7120 6849 3730 1755 19 134 908 1085 820 2457 4609 1863 683 3633 1875 4627 122 877 2706 27 6193 2665 7028 1598 3375 6927 5785 1347 5121 3665 1560 2584 4965 1456 3102 5026 914 7416 6150 4030

TABLE 1u (Rate 26/45) (n_(ldpc) = 16200) 3342 3896 286 2799 122 225 3074 527 4736 3291 6197 2055 782 2969 1015 3879 2215 2097 5913 3800 1450 4137 790 1711 4937 623 6654 764 5116 4633 2954 865 2768 1454 1505 4122 723 2893 3735 6674 686 6731 1152 1737 233 2045 6701 3020 2515 1392 1713 4962 3036 5227 4443 4815 5354 2875 4808 5610 912 2730 986 2966 6108 2589 2092 1356 6550 1153 1339 3811 6686 1612 4420 2154 1200 1202 46 5462 3392 2073 2641 2443 178 5965 451 3212 2712 2321 5295 3041 5632 4645 1917 1539 5801 4287 4140 3458 4908 1417 4610 6057 2469 6087 2938 2996 4452 3322 5275 5166 5231 556 2041 2394 5471 6178 3006 5507 6712 5367 70 3959 1974 4989 155 2620 119 3604 1833 3274 3612 4535 3651 1817 1942 2366 1835 1467 3842 4887 1502 5090 525 189 1386 3053 4727 5460 3135 3389 527 2521 2140 4513 5491 4293 5095 689 67 2882 4257 349 3269 3282 4172 3853 5318 2806 4695 1735 4460 6257 1798 4657 2292 2320 2999 4233 5016 3609 278 4528 6127 466 2331 926 6766 1132 3582 4533 678 1157 5108 3778 1832 4139 5790 5090 2141 6398 5184 4222 2042 6207 5466 3168 1871 1264 5917 6314 3659 2310 1742 5445 4140 6000 5150 1155 143 3400 2639 5768 2780 4987 1835 4146 6628 5734 4237 6148 4325 6696 2274 4915 3676 6728 5428 2176 5486 2627 4986 1929 68 742 3802 6509 1799 3406 3884 5524 2206 2757 896 6338 6365 6313 3387 1768 1345 2571 3380 5248 5100 5081 600 5783 4252 5992 5409 2738 1274 806 5715 3236 5172 1209 4525 5625 2842 6628 2395 5353 6118 4629 2380 3807 6094 3715 6294 4945 4441 1998 2041 5513 3323 4863 5342 1204 5258 5620 1792 4297 2964 3532 3457 2602 4708 960 2403 4037 3741 5923 5594 3939 4940 6339 2330 6292 4804 3631 6783 1879 2106 550 5910 2807 6503 4535 5812 4836 2742 35 5825 787 2097 3210 1116 2407 3792 903 5096 6116 4529 3796 2160 6276 3078 3567 3214 5177 3631 1224 285 4740 4420 1573 6196 5175 5035 3928 2295 4470 1737 5276 1239 6625 2942 4132 2375 1607 3463 5951 1281 82 1012 3477 1806 4920 1925 5574 5913 379 983 5057 6791 2752 1852 1132 3663 2878 2753 3655 1523 3624 6439 3113 6090 4755 4901 6589 2815 1145 2363 3350 5683 1992 1301 2028 1707 6200 5759 6062 6802 6165 4302 929 1545 6677 4104 109 3925 185 789 3408 6198 5102 459 2275 4508 5677 6836 4901 2072 6137 2648 2512 4391 5684 5406 2791 4801 2737 1955 3948 1201 3711 4746 1808 3060 3372 3310 555 188 133 3764 3949 2517 173 5046 3770 6557 4844 1249 2441 2706 5831 3683 2025 1935 2155 5753 3247 4264 5927 929 6555 4057 5649 1061 1378 2182 3482 1173 4857 2834 3977 4818 1849 516 3296 6744 4295 1249 2379 5218 386 1945 1673 3218 2083 4442 549 1634 2488 5987 1064 6001 2585 1821 5471 1009 6675 2846 4145 3467 3817 1096 6516 2071 2266 616 6128 6668 6004 5264 6787 5425 2438 2641 5574 6634 3556 780 5997 2387 4854 911 2855 4426 5797 6375 2520 6703 4228 6706 154 3603 3039 900 6570 6006 1980 2520 4509 863 1048 5120 6272 2444 2648 3009 39 455 2371 3763 3299 1389 1369 1042 5140 1690 6798 5400 6540 121 3308 4059 3300 4207 713 2486 4294 5370 4587 4522 3069 4534 5502 1111 3750 6526 750 5578 2265 1483 5754 1394 2879 4317 4966 1429 1891 4930 4675 745 5615

TABLE 1v (Rate 28/45) (n_(ldpc) = 16200) 2216 5353 6062 4045 2714 439 5415 1685 2362 1169 4069 4589 1144 2027 368 1630 3581 3086 1765 399 916 2662 4830 39 4003 2405 4737 4538 3125 2372 3690 4433 4812 3027 3019 5751 2219 883 2853 329 5644 2032 687 631 5202 3622 1372 4048 1947 4836 4630 5995 2000 933 917 1916 3151 4394 500 2889 2079 533 1817 6090 4829 5007 462 1363 4535 2260 2567 3541 3963 639 2123 3398 4196 1880 4933 3898 5325 3699 195 2509 6098 5401 2490 1934 4540 2715 2247 70 2526 5625 5855 3484 5293 3423 4853 2217 3597 5507 3633 5580 978 3900 479 5950 685 5778 186 1898 160 5418 197 2148 3231 3009 1214 2492 4687 3664 3441 4152 4621 3875 5621 2310 3414 3746 1618 1397 429 446 1402 5545 6016 218 255 4024 647 4204 3631 5470 173 871 5457 3157 619 2109 4665 5695 1996 277 5885 3967 5368 2835 5308 1675 4930 633 3581 1814 3494 5422 5575 4330 1686 479 1866 2365 2688 4753 698 5772 5857 2196 895 1433 4470 3550 740 431 418 2955 45 5727 5395 2902 2394 2986 5308 4595 535 1194 1834 632 1280 501 5445 5943 21 6059 5488 5287 2276 985 1833 220 1823 4772 476 5431 1362 9 1039 5597 2429 638 1928 109 5380 3549 2870 2193 5084 1568 74 1281 5299 5525 4099 5879 1684 5362 3542 1402 5044 3685 2767 3204 99 4201 1599 3598 5362 5780 3135 2119 54 986 1831 1858 1152 123 3250 936 4422 1254 1437 1101 615 1899 86 239 3572 3224 5850 3362 4258 1598 2433 1343 4786 40 4646 2069 1058 1453 877 418 1551 3509 4693 1851 1040 3104 388 4688 2306 5765 5836 1650 1988 398 2185 6068 4904 3583 4510 6071 2846 2144 5664 44 3840 2468 2632 5795 2988 3769 515 164 4562 3784 144 6001 5591 6032 1728 3749 3265 2300 4986 3085 1052 5096 2078 4664 1088 1119 6053 5544 11 3944 5079 3955 3576 1087 3175 457 492 5024 4484 174 572 2038 1979 4792 42 2230 587 3850 2663 2563 5654 1013 3026 465 4617 173 4316 1702 2914 5227 965 3472 5892 2667 256 5291 820 2850 1079 1882 4774 5825 5021 178 1791 3300 5047 6031 2350 5957 5190 4900 5174 1441 964 4274 599 1710 5031 2827 5490 3188 4508 628 5088 2262 3594 2622 954 499 76 4082 2678 4959 1174 5858 4221 2400 1477 3539 2175 2334 550 3994 639 5229 1628 4748 4845 157 1272 4726 1588 4984 3113 3011 5302 4257 4843 5548 1230 2197 2376 3119 3906 3481 475 2111 5481 5658 2372 5009 1651 12 2607 5285 5932 2683 1601 463 3431 5828 3783 4119 2358 3276 1966 1515 5809 1550 5938 3060 171 1727 2096 1254 5366 3267 1232 1867 4901 620 592 4316 5369 841 5451 1322 3247 2038 3029 823 4017 2171 408 788 4184 5128 2568 4318 5144 5968 5917 2086 5748 4216 322 5021 5857 1437 2016 2406 3114 1467 2221 3485 2093 2355 5344 3836 2942 3611 595 1241 3973 1357 1795 1685 5201 3401 79 1248 29 2269 2462 3871 4429 501 4446 4931 3977 4761 1207 3693 1461 4852 443 2989

TABLE 1w (Rate 31/36) (n_(ldpc) = 16200) 1271 1259 112 172 1770 1792 355 58 2103 1704 151 1728 542 1193 1157 1387 388 576 252 159 325 2049 1249 242 682 894 1040 1879 1088 233 597 1360 1189 761 1734 353 1039 817 1202 481 1401 855 1310 2033 1358 192 205 1906 860 1749 1216 1195 1550 484 1444 2004 589 1048 1927 883 2115 1203 705 1163 1482 531 2043 1375 504 682 1896 1312 984 845 928 1692 1139 2073 543 1326 219 970 1550 166 79 2110 1152 253 1651 1032 2079 493 764 266 848 1522 469 31 945 1553 564 1144 712 1499 1870 1747 688 1450 1821 58 2060 1607 1502 946 240 1559 668 1214 2213 1426 294 2033 1878 115 986 1285 609 572 257 2245 1605 2006 2152 685 1059 314 737 2055 467 1593 940 1432 1979 2140 1056 562 564 1749 1022 1835 626 1892 2155 266 232 788 222 1608 2062 1723 1480 1439 666 1715 76 325 354 1846 1328 1768 623 361 1766 1660 1351 2052 1977 1504 1224 157 1645 1512 298 1201 50 1606 1917 1846 619 2045 90 1503 1729 911 1252 497 1984 1917 798 1638 1309 1658 1436 1565 1260 1019 1568 1106 371 1361 1316 2074 2175 2146 1618 755 148 1783 1263 2231 918 2061 1546 1441 1356 927 1574 1021 1888 1737 1386 38 1665 1125 1069 744 1512 1136 336 1995 916 430 1673 1022 1799 2175 1391 472 273 1724 410 2180 2169 1411 2238 398 2105 812 1516 162 178 193 1116 1510 1261 1711 1619 1045 1912 451 415 1258 1141 1477 1001 377 1807 543 1352 438 1868 1658 929 2145 176 2042 1934 250 24 1874 825 1230 1170 2075 806 846 2082 2190 134 1471 479 2167 669 1857 590 1131 2078 73 1484 1108 2004 647 306 246 1492 1838 799 914 310 1489 722 1978 39 72 1748 1695 931 666 1559 1192 275 365 1229 1142 1738 1035 1955 1433 1573 1640 1152 1924 83 873 702 1020 1837 1776 2036 1782 441 1755 1498 1210 1513 1070 2193 296 313 300 2187 511 2243 1099 824 1456 1396 258 2243 607 287 1021 1782 1027 1611 1265 316 1153 704 814 1679 978 2192 709 1144 1253 856 64 1989 1251 1880 1434 172 944 1447 1200 776 1010 1844 747 655 582 1313 1664 2197 1385 2168 804 733 1711 981 273 367 161 1003 489 1422 1055 1710 1864 1729 1869 2240 891 567 649 475 952 1503 129 594 200 1215 1906 40 1952 1778 458 52 180 1098 1682 1757 2022 1487 1320 1148 1562 2006 2101 546 783 1711 1366 1141 85 1184 1376 268 1045 720 263 701 1844 1742 938 1909 2171 1093 74 421 1912 1675 309 974 1112 243 1691 139 2151 1557 2208 2057 2196 2135 1657 1026 852 1879 1397 381 2248 968 67 1315 1126 1909 258 955 1342 1238 1010 1499 511 1717 658 1841 831 1993 687 1484 631 2186 1496 625 1438 945 1210 675 1534 1394 1991 1771 1820 550 780 1537 61 1189 278 1672 2149 972 1289 1838 1330 819 348 2220 399 1644 1748 353 890 1477 904 1690 802 203 1529 1338 616 380 1246 806 1383 1237 1580 1651 1369 828 1964 1950 862 840 1356 2087 1674 1477 1996 1506 885 2093 179 282 189 42 992 1516 2005 576 225 470 1543 1320 402 2021 1020 694 2134 165 1499 1474 268 1082 1063 561 242 1111 554 1653 1416 401 19 1753 2064 1052 1447 2035 890 1260 963 1975 1536 1129 1158 984 373 1707 1697 623 1184 8 97
 648.


2. The method of claim 1, wherein the LDPC code is of a structure that facilitates use of a plurality of parallel engines for decoding the coded signal.
 3. The method of claim 1, wherein n_(ldpc)=64800 or n_(ldpc)=16200, and wherein m=360 for n_(ldpc)=64800, and m=90 for n_(ldpc)=16200.
 4. The method of claim 1, further comprising: modulating the coded LDPC frames according to according to one of the following modulation types: BPSK (Binary Phase Shift Keying), π/2 BPSK, OQPSK (Offset Quadrature Phase Shift Keying), QPSK (Quadrature Phase Shift Keying), 8-PSK (Phase Shift Keying), 16-APSK (Amplitude Phase Shift Keying), 32-APSK, 64-APSK and 256-APSK.
 5. The method of claim 1, wherein the source data sequence is segmented into a series of baseband frames, and the method further comprises: encoding each baseband frame based on a t-error Bose Chaudhuri Hocquenghem (BCH) code, wherein the BCH encoding comprises an outer coding and the LDPC encoding comprises an inner coding.
 6. The method of claim 5, further comprising: interleaving each coded LDPC frame using a block interleaver, wherein the coded bits are written into an interleaver array on a column-by-column basis and read out on a row-by-row basis, and the output of the interleaving comprises coded FEC frames.
 7. The method of claim 6, wherein the interleaver array comprises a number of rows and a number of columns, and the coded bits are read out of each row in a predetermined order, and wherein: the number of columns in the interleaver array is based on a selected modulation scheme as specified in the following table: # of Interleaver Modulation Array Scheme Columns 8PSK 3 16APSK 4 32APSK 5 64APSK 6 256APSK 8;

and the order in which the coded bits are read out of each row of the interleaver array is based on the selected modulation scheme and a selected code rate as specified in the following table (where the numbers reflecting the bit interleaver patterns chronologically signify a respective column of the row being read out, with “0” signifying the leftmost column): Modulation: Bit Interleaver Modulation: Bit Interleaver Code Rate Pattern Code Rate Pattern 8PSK: 23/36 0-1-2 32APSK: 7/9 1-0-2-3-4 8PSK: 25/36 1-0-2 64APSK: 13/18 4-1-2-5-0-3 8PSK: 13/18 1-0-2 64APSK: 3/4 2-3-5-0-4-1 16APSK: 19/36 0-3-1-2 64APSK: 7/9 2-0-1-5-4-3 16APSK: 11/20 2-1-3-0 64APSK: 4/5 1-2-4-0-5-3 16APSK: 26/45 3-2-0-1 64APSK: 5/6 4-2-1-0-5-3 16APSK: 3/5 3-2-1-0 64APSK: 31/36 2-3-4-0-5-1 16APSK: 28/45 3-0-1-2 256APSK: 2/3 1-3-2-4-7-6-5-0 16APSK: 23/36 3-0-2-1 256APSK: 25/36 4-2-3-5-1-0-6-7 16APSK: 25/36 2-3-1-0 256APSK: 13/18 4-5-3-2-1-0-7-6 16APSK: 13/18 3-0-2-1 256APSK: 3/4 5-1-2-4-3-6-0-7 16APSK: 7/9 0-3-2-1 256APSK: 7/9 2-1-3-5-4-0-6-7 32APSK: 2/3 2-1-4-3-0 256APSK: 4/5 1-3-4-2-7-0-5-6 16APSK: 31/36 1-0-3-2 256APSK: 5/6 3-5-6-1-2-4-0-7 32APSK: 13/18 3-0-2-1-4 256APSK: 31/36 3-4-1-2-6-0-7-5.


8. The method of claim 7, further comprising: modulating the coded FEC frames according to the selected modulation scheme, wherein the selected modulation scheme comprises one of the following modulation types: BPSK (Binary Phase Shift Keying), π/2 BPSK, OQPSK (Offset Quadrature Phase Shift Keying), QPSK (Quadrature Phase Shift Keying), 8-PSK (Phase Shift Keying), 16-APSK (Amplitude Phase Shift Keying), 32-APSK, 64-APSK and 256-APSK; wherein, in the case of BPSK, π/2 BPSK or QPSK, the coded FEC frames are not interleaved.
 9. The method of claim 8, wherein the selected modulation scheme is a 256-APSK modulation based on a signal constellation of a 32+32+64+64+64 ring format, having bit labeling and [x, y] bit coordinate positions as follows (where ε_(s) represents average energy per symbol, 32*R1²+32*R2²+64*R3²+64*R4²+64*R5²=256, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring, R3 represents the radius of the next outer ring, R4 represents the radius of the next outer ring, and R5 represents the radius of the outer-most ring): Bit Label [x, y] Coordinates 00000000 [R2 * {square root over (ε_(s))} * cos(π/32.0), R2 * {square root over (ε_(s))} * sin(π/32.0)] 00000001 [R1 * {square root over (ε_(s))} * cos(π/32.0), R1 * {square root over (ε_(s))} * sin(π/32.0)] 00000010 [R2 * {square root over (ε_(s))} * cos(3 * π/32.0), R2 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000011 [R1 * {square root over (ε_(s))} * cos(3 * π/32.0), R1 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000100 [R2 * {square root over (ε_(s))} * cos(7 * π/32.0), R2 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000101 [R1 * {square root over (ε_(s))} * cos(7 * π/32.0), R1 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000110 [R2 * {square root over (ε_(s))} * cos(5 * π/32.0), R2 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00000111 [R1 * {square root over (ε_(s))} * cos(5 * π/32.0), R1 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00001000 [R2 * {square root over (ε_(s))} * cos(15 * π/32.0), R2 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001001 [R1 * {square root over (ε_(s))} * cos(15 * π/32.0), R1 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001010 [R2 * {square root over (ε_(s))} * cos(13 * π/32.0), R2 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001011 [R1 * {square root over (ε_(s))} * cos(13 * π/32.0), R1 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001100 [R2 * {square root over (ε_(s))} * cos(9 * π/32.0), R2 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001101 [R1 * {square root over (ε_(s))} * cos(9 * π/32.0), R1 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001110 [R2 * {square root over (ε_(s))} * cos(11 * π/32.0), R2 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00001111 [R1 * {square root over (ε_(s))} * cos(11 * π/32.0), R1 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00010000 [R3 * {square root over (ε_(s))} * cos(π/64.0), R3 * {square root over (ε_(s))} * sin(π/64.0)] 00010001 [R3 * {square root over (ε_(s))} * cos(3 * π/64.0), R3 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00010010 [R3 * {square root over (ε_(s))} * cos(7 * π/64.0), R3 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00010011 [R3 * {square root over (ε_(s))} * cos(5 * π/64.0), R3 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00010100 [R3 * {square root over (ε_(s))} * cos(15 * π/64.0), R3 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00010101 [R3 * {square root over (ε_(s))} * cos(13 * π/64.0), R3 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00010110 [R3 * {square root over (ε_(s))} * cos(9 * π/64.0), R3 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00010111 [R3 * {square root over (ε_(s))} * cos(11 * π/64.0), R3 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00011000 [R3 * {square root over (ε_(s))} * cos(31 * π/64.0), R3 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00011001 [R3 * {square root over (ε_(s))} * cos(29 * π/64.0), R3 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00011010 [R3 * {square root over (ε_(s))} * cos(25 * π/64.0), R3 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00011011 [R3 * {square root over (ε_(s))} * cos(27 * π/64.0), R3 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00011100 [R3 * {square root over (ε_(s))} * cos(17 * π/64.0), R3 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00011101 [R3 * {square root over (ε_(s))} * cos(19 * π/64.0), R3 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00011110 [R3 * {square root over (ε_(s))} * cos(23 * π/64.0), R3 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00011111 [R3 * {square root over (ε_(s))} * cos(21 * π/64.0), R3 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00100000 [R5 * {square root over (ε_(s))} * cos(π/64.0), R5 * {square root over (ε_(s))} * sin(π/64.0)] 00100001 [R5 * {square root over (ε_(s))} * cos(3 * π/64.0), R5 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00100010 [R5 * {square root over (ε_(s))} * cos(7 * π/64.0), R5 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00100011 [R5 * {square root over (ε_(s))} * cos(5 * π/64.0), R5 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00100100 [R5 * {square root over (ε_(s))} * cos(15 * π/64.0), R5 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00100101 [R5 * {square root over (ε_(s))} * cos(13 * π/64.0), R5 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00100110 [R5 * {square root over (ε_(s))} * cos(9 * π/64.0), R5 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00100111 [R5 * {square root over (ε_(s))} * cos(11 * π/64.0), R5 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00101000 [R5 * {square root over (ε_(s))} * cos(31 * π/64.0), R5 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00101001 [R5 * {square root over (ε_(s))} * cos(29 * π/64.0), R5 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00101010 [R5 * {square root over (ε_(s))} * cos(25 * π/64.0), R5 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00101011 [R5 * {square root over (ε_(s))} * cos(27 * π/64.0), R5 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00101100 [R5 * {square root over (ε_(s))} * cos(17 * π/64.0), R5 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00101101 [R5 * {square root over (ε_(s))} * cos(19 * π/64.0), R5 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00101110 [R5 * {square root over (ε_(s))} * cos(23 * π/64.0), R5 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00101111 [R5 * {square root over (ε_(s))} * cos(21 * π/64.0), R5 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00110000 [R4 * {square root over (ε_(s))} * cos(π/64.0), R4 * {square root over (ε_(s))} * sin(π/64.0)] 00110001 [R4 * {square root over (ε_(s))} * cos(3 * π/64.0), R4 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00110010 [R4 * {square root over (ε_(s))} * cos(7 * π/64.0), R4 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00110011 [R4 * {square root over (ε_(s))} * cos(5 * π/64.0), R4 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00110100 [R4 * {square root over (ε_(s))} * cos(15 * π/64.0), R4 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00110101 [R4 * {square root over (ε_(s))} * cos(13 * π/64.0), R4 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00110110 [R4 * {square root over (ε_(s))} * cos(9 * π/64.0), R4 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00110111 [R4 * {square root over (ε_(s))} * cos(11 * π/64.0), R4 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00111000 [R4 * {square root over (ε_(s))} * cos(31 * π/64.0), R4 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00111001 [R4 * {square root over (ε_(s))} * cos(29 * π/64.0), R4 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00111010 [R4 * {square root over (ε_(s))} * cos(25 * π/64.0), R4 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00111011 [R4 * {square root over (ε_(s))} * cos(27 * π/64.0), R4 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00111100 [R4 * {square root over (ε_(s))} * cos(17 * π/64.0), R4 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00111101 [R4 * {square root over (ε_(s))} * cos(19 * π/64.0), R4 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00111110 [R4 * {square root over (ε_(s))} * cos(23 * π/64.0), R4 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00111111 [R4 * {square root over (ε_(s))} * cos(21 * π/64.0), R4 * {square root over (ε_(s))} * sin(21 * π/64.0)] 01000000 [R2 * {square root over (ε_(s))} * cos(31 * π/32.0), R2 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000001 [R1 * {square root over (ε_(s))} * cos(31 * π/32.0), R1 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000010 [R2 * {square root over (ε_(s))} * cos(29 * π/32.0), R2 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000011 [R1 * {square root over (ε_(s))} * cos(29 * π/32.0), R1 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000100 [R2 * {square root over (ε_(s))} * cos(25 * π/32.0), R2 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000101 [R1 * {square root over (ε_(s))} * cos(25 * π/32.0), R1 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000110 [R2 * {square root over (ε_(s))} * cos(27 * π/32.0), R2 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01000111 [R1 * {square root over (ε_(s))} * cos(27 * π/32.0), R1 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01001000 [R2 * {square root over (ε_(s))} * cos(17 * π/32.0), R2 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001001 [R1 * {square root over (ε_(s))} * cos(17 * π/32.0), R1 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001010 [R2 * {square root over (ε_(s))} * cos(19 * π/32.0), R2 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001011 [R1 * {square root over (ε_(s))} * cos(19 * π/32.0), R1 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001100 [R2 * {square root over (ε_(s))} * cos(23 * π/32.0), R2 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001101 [R1 * {square root over (ε_(s))} * cos(23 * π/32.0), R1 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001110 [R2 * {square root over (ε_(s))} * cos(21 * π/32.0), R2 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01001111 [R1 * {square root over (ε_(s))} * cos(21 * π/32.0), R1 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01010000 [R3 * {square root over (ε_(s))} * cos(63 * π/64.0), R3 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01010001 [R3 * {square root over (ε_(s))} * cos(61 * π/64.0), R3 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01010010 [R3 * {square root over (ε_(s))} * cos(57 * π/64.0), R3 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01010011 [R3 * {square root over (ε_(s))} * cos(59 * π/64.0), R3 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01010100 [R3 * {square root over (ε_(s))} * cos(49 * π/64.0), R3 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01010101 [R3 * {square root over (ε_(s))} * cos(51 * π/64.0), R3 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01010110 [R3 * {square root over (ε_(s))} * cos(55 * π/64.0), R3 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01010111 [R3 * {square root over (ε_(s))} * cos(53 * π/64.0), R3 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01011000 [R3 * {square root over (ε_(s))} * cos(33 * π/64.0), R3 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01011001 [R3 * {square root over (ε_(s))} * cos(35 * π/64.0), R3 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01011010 [R3 * {square root over (ε_(s))} * cos(39 * π/64.0), R3 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01011011 [R3 * {square root over (ε_(s))} * cos(37 * π/64.0), R3 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01011100 [R3 * {square root over (ε_(s))} * cos(47 * π/64.0), R3 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01011101 [R3 * {square root over (ε_(s))} * cos(45 * π/64.0), R3 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01011110 [R3 * {square root over (ε_(s))} * cos(41 * π/64.0), R3 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01011111 [R3 * {square root over (ε_(s))} * cos(43 * π/64.0), R3 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01100000 [R5 * {square root over (ε_(s))} * cos(63 * π/64.0), R5 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01100001 [R5 * {square root over (ε_(s))} * cos(61 * π/64.0), R5 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01100010 [R5 * {square root over (ε_(s))} * cos(57 * π/64.0), R5 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01100011 [R5 * {square root over (ε_(s))} * cos(59 * π/64.0), R5 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01100100 [R5 * {square root over (ε_(s))} * cos(49 * π/64.0), R5 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01100101 [R5 * {square root over (ε_(s))} * cos(51 * π/64.0), R5 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01100110 [R5 * {square root over (ε_(s))} * cos(55 * π/64.0), R5 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01100111 [R5 * {square root over (ε_(s))} * cos(53 * π/64.0), R5 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01101000 [R5 * {square root over (ε_(s))} * cos(33 * π/64.0), R5 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01101001 [R5 * {square root over (ε_(s))} * cos(35 * π/64.0), R5 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01101010 [R5 * {square root over (ε_(s))} * cos(39 * π/64.0), R5 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01101011 [R5 * {square root over (ε_(s))} * cos(37 * π/64.0), R5 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01101100 [R5 * {square root over (ε_(s))} * cos(47 * π/64.0), R5 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01101101 [R5 * {square root over (ε_(s))} * cos(45 * π/64.0), R5 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01101110 [R5 * {square root over (ε_(s))} * cos(41 * π/64.0), R5 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01101111 [R5 * {square root over (ε_(s))} * cos(43 * π/64.0), R5 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01110000 [R4 * {square root over (ε_(s))} * cos(63 * π/64.0), R4 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01110001 [R4 * {square root over (ε_(s))} * cos(61 * π/64.0), R4 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01110010 [R4 * {square root over (ε_(s))} * cos(57 * π/64.0), R4 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01110011 [R4 * {square root over (ε_(s))} * cos(59 * π/64.0), R4 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01110100 [R4 * {square root over (ε_(s))} * cos(49 * π/64.0), R4 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01110101 [R4 * {square root over (ε_(s))} * cos(51 * π/64.0), R4 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01110110 [R4 * {square root over (ε_(s))} * cos(55 * π/64.0), R4 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01110111 [R4 * {square root over (ε_(s))} * cos(53 * π/64.0), R4 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01111000 [R4 * {square root over (ε_(s))} * cos(33 * π/64.0), R4 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01111001 [R4 * {square root over (ε_(s))} * cos(35 * π/64.0), R4 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01111010 [R4 * {square root over (ε_(s))} * cos(39 * π/64.0), R4 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01111011 [R4 * {square root over (ε_(s))} * cos(37 * π/64.0), R4 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01111100 [R4 * {square root over (ε_(s))} * cos(47 * π/64.0), R4 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01111101 [R4 * {square root over (ε_(s))} * cos(45 * π/64.0), R4 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01111110 [R4 * {square root over (ε_(s))} * cos(41 * π/64.0), R4 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01111111 [R4 * {square root over (ε_(s))} * cos(43 * π/64.0), R4 * {square root over (ε_(s))} * sin(43 * π/64.0)] 10000000 [R2 * {square root over (ε_(s))} * cos(63 * π/32.0), R2 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000001 [R1 * {square root over (ε_(s))} * cos(63 * π/32.0), R1 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000010 [R2 * {square root over (ε_(s))} * cos(61 * π/32.0), R2 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000011 [R1 * {square root over (ε_(s))} * cos(61 * π/32.0), R1 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000100 [R2 * {square root over (ε_(s))} * cos(57 * π/32.0), R2 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000101 [R1 * {square root over (ε_(s))} * cos(57 * π/32.0), R1 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000110 [R2 * {square root over (ε_(s))} * cos(59 * π/32.0), R2 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10000111 [R1 * {square root over (ε_(s))} * cos(59 * π/32.0), R1 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10001000 [R2 * {square root over (ε_(s))} * cos(49 * π/32.0), R2 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001001 [R1 * {square root over (ε_(s))} * cos(49 * π/32.0), R1 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001010 [R2 * {square root over (ε_(s))} * cos(51 * π/32.0), R2 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001011 [R1 * {square root over (ε_(s))} * cos(51 * π/32.0), R1 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001100 [R2 * {square root over (ε_(s))} * cos(55 * π/32.0), R2 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001101 [R1 * {square root over (ε_(s))} * cos(55 * π/32.0), R1 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001110 [R2 * {square root over (ε_(s))} * cos(53 * π/32.0), R2 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10001111 [R1 * {square root over (ε_(s))} * cos(53 * π/32.0), R1 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10010000 [R3 * {square root over (ε_(s))} * cos(127 * π/64.0), R3 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10010001 [R3 * {square root over (ε_(s))} * cos(125 * π/64.0), R3 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10010010 [R3 * {square root over (ε_(s))} * cos(121 * π/64.0), R3 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10010011 [R3 * {square root over (ε_(s))} * cos(123 * π/64.0), R3 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10010100 [R3 * {square root over (ε_(s))} * cos(113 * π/64.0), R3 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10010101 [R3 * {square root over (ε_(s))} * cos(115 * π/64.0), R3 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10010110 [R3 * {square root over (ε_(s))} * cos(119 * π/64.0), R3 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10010111 [R3 * {square root over (ε_(s))} * cos(117 * π/64.0), R3 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10011000 [R3 * {square root over (ε_(s))} * cos(97 * π/64.0), R3 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10011001 [R3 * {square root over (ε_(s))} * cos(99 * π/64.0), R3 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10011010 [R3 * {square root over (ε_(s))} * cos(103 * π/64.0), R3 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10011011 [R3 * {square root over (ε_(s))} * cos(101 * π/64.0), R3 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10011100 [R3 * {square root over (ε_(s))} * cos(111 * π/64.0), R3 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10011101 [R3 * {square root over (ε_(s))} * cos(109 * π/64.0), R3 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10011110 [R3 * {square root over (ε_(s))} * cos(105 * π/64.0), R3 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10011111 [R3 * {square root over (ε_(s))} * cos(107 * π/64.0), R3 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10100000 [R5 * {square root over (ε_(s))} * cos(127 * π/64.0), R5 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10100001 [R5 * {square root over (ε_(s))} * cos(125 * π/64.0), R5 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10100010 [R5 * {square root over (ε_(s))} * cos(121 * π/64.0), R5 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10100011 [R5 * {square root over (ε_(s))} * cos(123 * π/64.0), R5 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10100100 [R5 * {square root over (ε_(s))} * cos(113 * π/64.0), R5 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10100101 [R5 * {square root over (ε_(s))} * cos(115 * π/64.0), R5 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10100110 [R5 * {square root over (ε_(s))} * cos(119 * π/64.0), R5 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10100111 [R5 * {square root over (ε_(s))} * cos(117 * π/64.0), R5 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10101000 [R5 * {square root over (ε_(s))} * cos(97 * π/64.0), R5 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10101001 [R5 * {square root over (ε_(s))} * cos(99 * π/64.0), R5 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10101010 [R5 * {square root over (ε_(s))} * cos(103 * π/64.0), R5 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10101011 [R5 * {square root over (ε_(s))} * cos(101 * π/64.0), R5 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10101100 [R5 * {square root over (ε_(s))} * cos(111 * π/64.0), R5 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10101101 [R5 * {square root over (ε_(s))} * cos(109 * π/64.0), R5 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10101110 [R5 * {square root over (ε_(s))} * cos(105 * π/64.0), R5 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10101111 [R5 * {square root over (ε_(s))} * cos(107 * π/64.0), R5 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10110000 [R4 * {square root over (ε_(s))} * cos(127 * π/64.0), R4 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10110001 [R4 * {square root over (ε_(s))} * cos(125 * π/64.0), R4 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10110010 [R4 * {square root over (ε_(s))} * cos(121 * π/64.0), R4 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10110011 [R4 * {square root over (ε_(s))} * cos(123 * π/64.0), R4 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10110100 [R4 * {square root over (ε_(s))} * cos(113 * π/64.0), R4 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10110101 [R4 * {square root over (ε_(s))} * cos(115 * π/64.0), R4 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10110110 [R4 * {square root over (ε_(s))} * cos(119 * π/64.0), R4 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10110111 [R4 * {square root over (ε_(s))} * cos(117 * π/64.0), R4 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10111000 [R4 * {square root over (ε_(s))} * cos(97 * π/64.0), R4 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10111001 [R4 * {square root over (ε_(s))} * cos(99 * π/64.0), R4 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10111010 [R4 * {square root over (ε_(s))} * cos(103 * π/64.0), R4 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10111011 [R4 * {square root over (ε_(s))} * cos(101 * π/64.0), R4 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10111100 [R4 * {square root over (ε_(s))} * cos(111 * π/64.0), R4 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10111101 [R4 * {square root over (ε_(s))} * cos(109 * π/64.0), R4 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10111110 [R4 * {square root over (ε_(s))} * cos(105 * π/64.0), R4 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10111111 [R4 * {square root over (ε_(s))} * cos(107 * π/64.0), R4 * {square root over (ε_(s))} * sin(107 * π/64.0)] 11000000 [R2 * {square root over (ε_(s))} * cos(33 * π/32.0), R2 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000001 [R1 * {square root over (ε_(s))} * cos(33 * π/32.0), R1 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000010 [R2 * {square root over (ε_(s))} * cos(35 * π/32.0), R2 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000011 [R1 * {square root over (ε_(s))} * cos(35 * π/32.0), R1 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000100 [R2 * {square root over (ε_(s))} * cos(39 * π/32.0), R2 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000101 [R1 * {square root over (ε_(s))} * cos(39 * π/32.0), R1 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000110 [R2 * {square root over (ε_(s))} * cos(37 * π/32.0), R2 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11000111 [R1 * {square root over (ε_(s))} * cos(37 * π/32.0), R1 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11001000 [R2 * {square root over (ε_(s))} * cos(47 * π/32.0), R2 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001001 [R1 * {square root over (ε_(s))} * cos(47 * π/32.0), R1 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001010 [R2 * {square root over (ε_(s))} * cos(45 * π/32.0), R2 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001011 [R1 * {square root over (ε_(s))} * cos(45 * π/32.0), R1 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001100 [R2 * {square root over (ε_(s))} * cos(41 * π/32.0), R2 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001101 [R1 * {square root over (ε_(s))} * cos(41 * π/32.0), R1 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001110 [R2 * {square root over (ε_(s))} * cos(43 * π/32.0), R2 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11001111 [R1 * {square root over (ε_(s))} * cos(43 * π/32.0), R1 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11010000 [R3 * {square root over (ε_(s))} * cos(65 * π/64.0), R3 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11010001 [R3 * {square root over (ε_(s))} * cos(67 * π/64.0), R3 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11010010 [R3 * {square root over (ε_(s))} * cos(71 * π/64.0), R3 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11010011 [R3 * {square root over (ε_(s))} * cos(69 * π/64.0), R3 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11010100 [R3 * {square root over (ε_(s))} * cos(79 * π/64.0), R3 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11010101 [R3 * {square root over (ε_(s))} * cos(77 * π/64.0), R3 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11010110 [R3 * {square root over (ε_(s))} * cos(73 * π/64.0), R3 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11010111 [R3 * {square root over (ε_(s))} * cos(75 * π/64.0), R3 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11011000 [R3 * {square root over (ε_(s))} * cos(95 * π/64.0), R3 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11011001 [R3 * {square root over (ε_(s))} * cos(93 * π/64.0), R3 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11011010 [R3 * {square root over (ε_(s))} * cos(89 * π/64.0), R3 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11011011 [R3 * {square root over (ε_(s))} * cos(91 * π/64.0), R3 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11011100 [R3 * {square root over (ε_(s))} * cos(81 * π/64.0), R3 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11011101 [R3 * {square root over (ε_(s))} * cos(83 * π/64.0), R3 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11011110 [R3 * {square root over (ε_(s))} * cos(87 * π/64.0), R3 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11011111 [R3 * {square root over (ε_(s))} * cos(85 * π/64.0), R3 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11100000 [R5 * {square root over (ε_(s))} * cos(65 * π/64.0), R5 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11100001 [R5 * {square root over (ε_(s))} * cos(67 * π/64.0), R5 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11100010 [R5 * {square root over (ε_(s))} * cos(71 * π/64.0), R5 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11100011 [R5 * {square root over (ε_(s))} * cos(69 * π/64.0), R5 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11100100 [R5 * {square root over (ε_(s))} * cos(79 * π/64.0), R5 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11100101 [R5 * {square root over (ε_(s))} * cos(77 * π/64.0), R5 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11100110 [R5 * {square root over (ε_(s))} * cos(73 * π/64.0), R5 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11100111 [R5 * {square root over (ε_(s))} * cos(75 * π/64.0), R5 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11101000 [R5 * {square root over (ε_(s))} * cos(95 * π/64.0), R5 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11101001 [R5 * {square root over (ε_(s))} * cos(93 * π/64.0), R5 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11101010 [R5 * {square root over (ε_(s))} * cos(89 * π/64.0), R5 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11101011 [R5 * {square root over (ε_(s))} * cos(91 * π/64.0), R5 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11101100 [R5 * {square root over (ε_(s))} * cos(81 * π/64.0), R5 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11101101 [R5 * {square root over (ε_(s))} * cos(83 * π/64.0), R5 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11101110 [R5 * {square root over (ε_(s))} * cos(87 * π/64.0), R5 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11101111 [R5 * {square root over (ε_(s))} * cos(85 * π/64.0), R5 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11110000 [R4 * {square root over (ε_(s))} * cos(65 * π/64.0), R4 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11110001 [R4 * {square root over (ε_(s))} * cos(67 * π/64.0), R4 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11110010 [R4 * {square root over (ε_(s))} * cos(71 * π/64.0), R4 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11110011 [R4 * {square root over (ε_(s))} * cos(69 * π/64.0), R4 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11110100 [R4 * {square root over (ε_(s))} * cos(79 * π/64.0), R4 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11110101 [R4 * {square root over (ε_(s))} * cos(77 * π/64.0), R4 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11110110 [R4 * {square root over (ε_(s))} * cos(73 * π/64.0), R4 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11110111 [R4 * {square root over (ε_(s))} * cos(75 * π/64.0), R4 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11111000 [R4 * {square root over (ε_(s))} * cos(95 * π/64.0), R4 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11111001 [R4 * {square root over (ε_(s))} * cos(93 * π/64.0), R4 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11111010 [R4 * {square root over (ε_(s))} * cos(89 * π/64.0), R4 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11111011 [R4 * {square root over (ε_(s))} * cos(91 * π/64.0), R4 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11111100 [R4 * {square root over (ε_(s))} * cos(81 * π/64.0), R4 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11111101 [R4 * {square root over (ε_(s))} * cos(83 * π/64.0), R4 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11111110 [R4 * {square root over (ε_(s))} * cos(87 * π/64.0), R4 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11111111 [R4 * {square root over (ε_(s))} * cos(85 * π/64.0), R4 * {square root over (ε_(s))} * sin(85 * π/64.0)].


10. A method, comprising: modulating a signal, via a modulation device, in accordance with a 256-APSK modulation based on a signal constellation of a 32+32+64+64+64 ring format, having bit labeling and [x, y] bit coordinate positions as follows (where ε_(s) represents average energy per symbol, 32*R1²+32*R2²+64*R3²+64*R4²+64*R5²=256, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring, R3 represents the radius of the next outer ring, R4 represents the radius of the next outer ring, and R5 represents the radius of the outer-most ring): Bit Label [x, y] Coordinates 00000000 [R2 * {square root over (ε_(s))} * cos(π/32.0), R2 * {square root over (ε_(s))} * sin(π/32.0)] 00000001 [R1 * {square root over (ε_(s))} * cos(π/32.0), R1 * {square root over (ε_(s))} * sin(π/32.0)] 00000010 [R2 * {square root over (ε_(s))} * cos(3 * π/32.0), R2 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000011 [R1 * {square root over (ε_(s))} * cos(3 * π/32.0), R1 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000100 [R2 * {square root over (ε_(s))} * cos(7 * π/32.0), R2 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000101 [R1 * {square root over (ε_(s))} * cos(7 * π/32.0), R1 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000110 [R2 * {square root over (ε_(s))} * cos(5 * π/32.0), R2 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00000111 [R1 * {square root over (ε_(s))} * cos(5 * π/32.0), R1 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00001000 [R2 * {square root over (ε_(s))} * cos(15 * π/32.0), R2 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001001 [R1 * {square root over (ε_(s))} * cos(15 * π/32.0), R1 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001010 [R2 * {square root over (ε_(s))} * cos(13 * π/32.0), R2 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001011 [R1 * {square root over (ε_(s))} * cos(13 * π/32.0), R1 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001100 [R2 * {square root over (ε_(s))} * cos(9 * π/32.0), R2 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001101 [R1 * {square root over (ε_(s))} * cos(9 * π/32.0), R1 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001110 [R2 * {square root over (ε_(s))} * cos(11 * π/32.0), R2 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00001111 [R1 * {square root over (ε_(s))} * cos(11 * π/32.0), R1 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00010000 [R3 * {square root over (ε_(s))} * cos(π/64.0), R3 * {square root over (ε_(s))} * sin(π/64.0)] 00010001 [R3 * {square root over (ε_(s))} * cos(3 * π/64.0), R3 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00010010 [R3 * {square root over (ε_(s))} * cos(7 * π/64.0), R3 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00010011 [R3 * {square root over (ε_(s))} * cos(5 * π/64.0), R3 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00010100 [R3 * {square root over (ε_(s))} * cos(15 * π/64.0), R3 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00010101 [R3 * {square root over (ε_(s))} * cos(13 * π/64.0), R3 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00010110 [R3 * {square root over (ε_(s))} * cos(9 * π/64.0), R3 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00010111 [R3 * {square root over (ε_(s))} * cos(11 * π/64.0), R3 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00011000 [R3 * {square root over (ε_(s))} * cos(31 * π/64.0), R3 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00011001 [R3 * {square root over (ε_(s))} * cos(29 * π/64.0), R3 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00011010 [R3 * {square root over (ε_(s))} * cos(25 * π/64.0), R3 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00011011 [R3 * {square root over (ε_(s))} * cos(27 * π/64.0), R3 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00011100 [R3 * {square root over (ε_(s))} * cos(17 * π/64.0), R3 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00011101 [R3 * {square root over (ε_(s))} * cos(19 * π/64.0), R3 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00011110 [R3 * {square root over (ε_(s))} * cos(23 * π/64.0), R3 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00011111 [R3 * {square root over (ε_(s))} * cos(21 * π/64.0), R3 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00100000 [R5 * {square root over (ε_(s))} * cos(π/64.0), R5 * {square root over (ε_(s))} * sin(π/64.0)] 00100001 [R5 * {square root over (ε_(s))} * cos(3 * π/64.0), R5 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00100010 [R5 * {square root over (ε_(s))} * cos(7 * π/64.0), R5 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00100011 [R5 * {square root over (ε_(s))} * cos(5 * π/64.0), R5 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00100100 [R5 * {square root over (ε_(s))} * cos(15 * π/64.0), R5 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00100101 [R5 * {square root over (ε_(s))} * cos(13 * π/64.0), R5 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00100110 [R5 * {square root over (ε_(s))} * cos(9 * π/64.0), R5 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00100111 [R5 * {square root over (ε_(s))} * cos(11 * π/64.0), R5 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00101000 [R5 * {square root over (ε_(s))} * cos(31 * π/64.0), R5 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00101001 [R5 * {square root over (ε_(s))} * cos(29 * π/64.0), R5 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00101010 [R5 * {square root over (ε_(s))} * cos(25 * π/64.0), R5 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00101011 [R5 * {square root over (ε_(s))} * cos(27 * π/64.0), R5 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00101100 [R5 * {square root over (ε_(s))} * cos(17 * π/64.0), R5 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00101101 [R5 * {square root over (ε_(s))} * cos(19 * π/64.0), R5 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00101110 [R5 * {square root over (ε_(s))} * cos(23 * π/64.0), R5 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00101111 [R5 * {square root over (ε_(s))} * cos(21 * π/64.0), R5 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00110000 [R4 * {square root over (ε_(s))} * cos(π/64.0), R4 * {square root over (ε_(s))} * sin(π/64.0)] 00110001 [R4 * {square root over (ε_(s))} * cos(3 * π/64.0), R4 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00110010 [R4 * {square root over (ε_(s))} * cos(7 * π/64.0), R4 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00110011 [R4 * {square root over (ε_(s))} * cos(5 * π/64.0), R4 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00110100 [R4 * {square root over (ε_(s))} * cos(15 * π/64.0), R4 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00110101 [R4 * {square root over (ε_(s))} * cos(13 * π/64.0), R4 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00110110 [R4 * {square root over (ε_(s))} * cos(9 * π/64.0), R4 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00110111 [R4 * {square root over (ε_(s))} * cos(11 * π/64.0), R4 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00111000 [R4 * {square root over (ε_(s))} * cos(31 * π/64.0), R4 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00111001 [R4 * {square root over (ε_(s))} * cos(29 * π/64.0), R4 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00111010 [R4 * {square root over (ε_(s))} * cos(25 * π/64.0), R4 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00111011 [R4 * {square root over (ε_(s))} * cos(27 * π/64.0), R4 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00111100 [R4 * {square root over (ε_(s))} * cos(17 * π/64.0), R4 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00111101 [R4 * {square root over (ε_(s))} * cos(19 * π/64.0), R4 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00111110 [R4 * {square root over (ε_(s))} * cos(23 * π/64.0), R4 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00111111 [R4 * {square root over (ε_(s))} * cos(21 * π/64.0), R4 * {square root over (ε_(s))} * sin(21 * π/64.0)] 01000000 [R2 * {square root over (ε_(s))} * cos(31 * π/32.0), R2 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000001 [R1 * {square root over (ε_(s))} * cos(31 * π/32.0), R1 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000010 [R2 * {square root over (ε_(s))} * cos(29 * π/32.0), R2 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000011 [R1 * {square root over (ε_(s))} * cos(29 * π/32.0), R1 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000100 [R2 * {square root over (ε_(s))} * cos(25 * π/32.0), R2 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000101 [R1 * {square root over (ε_(s))} * cos(25 * π/32.0), R1 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000110 [R2 * {square root over (ε_(s))} * cos(27 * π/32.0), R2 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01000111 [R1 * {square root over (ε_(s))} * cos(27 * π/32.0), R1 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01001000 [R2 * {square root over (ε_(s))} * cos(17 * π/32.0), R2 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001001 [R1 * {square root over (ε_(s))} * cos(17 * π/32.0), R1 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001010 [R2 * {square root over (ε_(s))} * cos(19 * π/32.0), R2 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001011 [R1 * {square root over (ε_(s))} * cos(19 * π/32.0), R1 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001100 [R2 * {square root over (ε_(s))} * cos(23 * π/32.0), R2 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001101 [R1 * {square root over (ε_(s))} * cos(23 * π/32.0), R1 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001110 [R2 * {square root over (ε_(s))} * cos(21 * π/32.0), R2 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01001111 [R1 * {square root over (ε_(s))} * cos(21 * π/32.0), R1 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01010000 [R3 * {square root over (ε_(s))} * cos(63 * π/64.0), R3 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01010001 [R3 * {square root over (ε_(s))} * cos(61 * π/64.0), R3 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01010010 [R3 * {square root over (ε_(s))} * cos(57 * π/64.0), R3 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01010011 [R3 * {square root over (ε_(s))} * cos(59 * π/64.0), R3 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01010100 [R3 * {square root over (ε_(s))} * cos(49 * π/64.0), R3 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01010101 [R3 * {square root over (ε_(s))} * cos(51 * π/64.0), R3 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01010110 [R3 * {square root over (ε_(s))} * cos(55 * π/64.0), R3 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01010111 [R3 * {square root over (ε_(s))} * cos(53 * π/64.0), R3 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01011000 [R3 * {square root over (ε_(s))} * cos(33 * π/64.0), R3 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01011001 [R3 * {square root over (ε_(s))} * cos(35 * π/64.0), R3 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01011010 [R3 * {square root over (ε_(s))} * cos(39 * π/64.0), R3 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01011011 [R3 * {square root over (ε_(s))} * cos(37 * π/64.0), R3 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01011100 [R3 * {square root over (ε_(s))} * cos(47 * π/64.0), R3 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01011101 [R3 * {square root over (ε_(s))} * cos(45 * π/64.0), R3 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01011110 [R3 * {square root over (ε_(s))} * cos(41 * π/64.0), R3 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01011111 [R3 * {square root over (ε_(s))} * cos(43 * π/64.0), R3 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01100000 [R5 * {square root over (ε_(s))} * cos(63 * π/64.0), R5 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01100001 [R5 * {square root over (ε_(s))} * cos(61 * π/64.0), R5 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01100010 [R5 * {square root over (ε_(s))} * cos(57 * π/64.0), R5 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01100011 [R5 * {square root over (ε_(s))} * cos(59 * π/64.0), R5 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01100100 [R5 * {square root over (ε_(s))} * cos(49 * π/64.0), R5 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01100101 [R5 * {square root over (ε_(s))} * cos(51 * π/64.0), R5 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01100110 [R5 * {square root over (ε_(s))} * cos(55 * π/64.0), R5 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01100111 [R5 * {square root over (ε_(s))} * cos(53 * π/64.0), R5 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01101000 [R5 * {square root over (ε_(s))} * cos(33 * π/64.0), R5 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01101001 [R5 * {square root over (ε_(s))} * cos(35 * π/64.0), R5 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01101010 [R5 * {square root over (ε_(s))} * cos(39 * π/64.0), R5 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01101011 [R5 * {square root over (ε_(s))} * cos(37 * π/64.0), R5 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01101100 [R5 * {square root over (ε_(s))} * cos(47 * π/64.0), R5 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01101101 [R5 * {square root over (ε_(s))} * cos(45 * π/64.0), R5 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01101110 [R5 * {square root over (ε_(s))} * cos(41 * π/64.0), R5 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01101111 [R5 * {square root over (ε_(s))} * cos(43 * π/64.0), R5 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01110000 [R4 * {square root over (ε_(s))} * cos(63 * π/64.0), R4 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01110001 [R4 * {square root over (ε_(s))} * cos(61 * π/64.0), R4 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01110010 [R4 * {square root over (ε_(s))} * cos(57 * π/64.0), R4 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01110011 [R4 * {square root over (ε_(s))} * cos(59 * π/64.0), R4 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01110100 [R4 * {square root over (ε_(s))} * cos(49 * π/64.0), R4 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01110101 [R4 * {square root over (ε_(s))} * cos(51 * π/64.0), R4 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01110110 [R4 * {square root over (ε_(s))} * cos(55 * π/64.0), R4 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01110111 [R4 * {square root over (ε_(s))} * cos(53 * π/64.0), R4 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01111000 [R4 * {square root over (ε_(s))} * cos(33 * π/64.0), R4 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01111001 [R4 * {square root over (ε_(s))} * cos(35 * π/64.0), R4 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01111010 [R4 * {square root over (ε_(s))} * cos(39 * π/64.0), R4 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01111011 [R4 * {square root over (ε_(s))} * cos(37 * π/64.0), R4 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01111100 [R4 * {square root over (ε_(s))} * cos(47 * π/64.0), R4 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01111101 [R4 * {square root over (ε_(s))} * cos(45 * π/64.0), R4 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01111110 [R4 * {square root over (ε_(s))} * cos(41 * π/64.0), R4 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01111111 [R4 * {square root over (ε_(s))} * cos(43 * π/64.0), R4 * {square root over (ε_(s))} * sin(43 * π/64.0)] 10000000 [R2 * {square root over (ε_(s))} * cos(63 * π/32.0), R2 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000001 [R1 * {square root over (ε_(s))} * cos(63 * π/32.0), R1 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000010 [R2 * {square root over (ε_(s))} * cos(61 * π/32.0), R2 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000011 [R1 * {square root over (ε_(s))} * cos(61 * π/32.0), R1 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000100 [R2 * {square root over (ε_(s))} * cos(57 * π/32.0), R2 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000101 [R1 * {square root over (ε_(s))} * cos(57 * π/32.0), R1 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000110 [R2 * {square root over (ε_(s))} * cos(59 * π/32.0), R2 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10000111 [R1 * {square root over (ε_(s))} * cos(59 * π/32.0), R1 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10001000 [R2 * {square root over (ε_(s))} * cos(49 * π/32.0), R2 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001001 [R1 * {square root over (ε_(s))} * cos(49 * π/32.0), R1 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001010 [R2 * {square root over (ε_(s))} * cos(51 * π/32.0), R2 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001011 [R1 * {square root over (ε_(s))} * cos(51 * π/32.0), R1 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001100 [R2 * {square root over (ε_(s))} * cos(55 * π/32.0), R2 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001101 [R1 * {square root over (ε_(s))} * cos(55 * π/32.0), R1 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001110 [R2 * {square root over (ε_(s))} * cos(53 * π/32.0), R2 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10001111 [R1 * {square root over (ε_(s))} * cos(53 * π/32.0), R1 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10010000 [R3 * {square root over (ε_(s))} * cos(127 * π/64.0), R3 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10010001 [R3 * {square root over (ε_(s))} * cos(125 * π/64.0), R3 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10010010 [R3 * {square root over (ε_(s))} * cos(121 * π/64.0), R3 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10010011 [R3 * {square root over (ε_(s))} * cos(123 * π/64.0), R3 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10010100 [R3 * {square root over (ε_(s))} * cos(113 * π/64.0), R3 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10010101 [R3 * {square root over (ε_(s))} * cos(115 * π/64.0), R3 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10010110 [R3 * {square root over (ε_(s))} * cos(119 * π/64.0), R3 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10010111 [R3 * {square root over (ε_(s))} * cos(117 * π/64.0), R3 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10011000 [R3 * {square root over (ε_(s))} * cos(97 * π/64.0), R3 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10011001 [R3 * {square root over (ε_(s))} * cos(99 * π/64.0), R3 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10011010 [R3 * {square root over (ε_(s))} * cos(103 * π/64.0), R3 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10011011 [R3 * {square root over (ε_(s))} * cos(101 * π/64.0), R3 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10011100 [R3 * {square root over (ε_(s))} * cos(111 * π/64.0), R3 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10011101 [R3 * {square root over (ε_(s))} * cos(109 * π/64.0), R3 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10011110 [R3 * {square root over (ε_(s))} * cos(105 * π/64.0), R3 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10011111 [R3 * {square root over (ε_(s))} * cos(107 * π/64.0), R3 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10100000 [R5 * {square root over (ε_(s))} * cos(127 * π/64.0), R5 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10100001 [R5 * {square root over (ε_(s))} * cos(125 * π/64.0), R5 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10100010 [R5 * {square root over (ε_(s))} * cos(121 * π/64.0), R5 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10100011 [R5 * {square root over (ε_(s))} * cos(123 * π/64.0), R5 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10100100 [R5 * {square root over (ε_(s))} * cos(113 * π/64.0), R5 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10100101 [R5 * {square root over (ε_(s))} * cos(115 * π/64.0), R5 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10100110 [R5 * {square root over (ε_(s))} * cos(119 * π/64.0), R5 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10100111 [R5 * {square root over (ε_(s))} * cos(117 * π/64.0), R5 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10101000 [R5 * {square root over (ε_(s))} * cos(97 * π/64.0), R5 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10101001 [R5 * {square root over (ε_(s))} * cos(99 * π/64.0), R5 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10101010 [R5 * {square root over (ε_(s))} * cos(103 * π/64.0), R5 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10101011 [R5 * {square root over (ε_(s))} * cos(101 * π/64.0), R5 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10101100 [R5 * {square root over (ε_(s))} * cos(111 * π/64.0), R5 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10101101 [R5 * {square root over (ε_(s))} * cos(109 * π/64.0), R5 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10101110 [R5 * {square root over (ε_(s))} * cos(105 * π/64.0), R5 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10101111 [R5 * {square root over (ε_(s))} * cos(107 * π/64.0), R5 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10110000 [R4 * {square root over (ε_(s))} * cos(127 * π/64.0), R4 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10110001 [R4 * {square root over (ε_(s))} * cos(125 * π/64.0), R4 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10110010 [R4 * {square root over (ε_(s))} * cos(121 * π/64.0), R4 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10110011 [R4 * {square root over (ε_(s))} * cos(123 * π/64.0), R4 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10110100 [R4 * {square root over (ε_(s))} * cos(113 * π/64.0), R4 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10110101 [R4 * {square root over (ε_(s))} * cos(115 * π/64.0), R4 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10110110 [R4 * {square root over (ε_(s))} * cos(119 * π/64.0), R4 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10110111 [R4 * {square root over (ε_(s))} * cos(117 * π/64.0), R4 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10111000 [R4 * {square root over (ε_(s))} * cos(97 * π/64.0), R4 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10111001 [R4 * {square root over (ε_(s))} * cos(99 * π/64.0), R4 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10111010 [R4 * {square root over (ε_(s))} * cos(103 * π/64.0), R4 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10111011 [R4 * {square root over (ε_(s))} * cos(101 * π/64.0), R4 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10111100 [R4 * {square root over (ε_(s))} * cos(111 * π/64.0), R4 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10111101 [R4 * {square root over (ε_(s))} * cos(109 * π/64.0), R4 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10111110 [R4 * {square root over (ε_(s))} * cos(105 * π/64.0), R4 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10111111 [R4 * {square root over (ε_(s))} * cos(107 * π/64.0), R4 * {square root over (ε_(s))} * sin(107 * π/64.0)] 11000000 [R2 * {square root over (ε_(s))} * cos(33 * π/32.0), R2 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000001 [R1 * {square root over (ε_(s))} * cos(33 * π/32.0), R1 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000010 [R2 * {square root over (ε_(s))} * cos(35 * π/32.0), R2 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000011 [R1 * {square root over (ε_(s))} * cos(35 * π/32.0), R1 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000100 [R2 * {square root over (ε_(s))} * cos(39 * π/32.0), R2 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000101 [R1 * {square root over (ε_(s))} * cos(39 * π/32.0), R1 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000110 [R2 * {square root over (ε_(s))} * cos(37 * π/32.0), R2 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11000111 [R1 * {square root over (ε_(s))} * cos(37 * π/32.0), R1 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11001000 [R2 * {square root over (ε_(s))} * cos(47 * π/32.0), R2 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001001 [R1 * {square root over (ε_(s))} * cos(47 * π/32.0), R1 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001010 [R2 * {square root over (ε_(s))} * cos(45 * π/32.0), R2 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001011 [R1 * {square root over (ε_(s))} * cos(45 * π/32.0), R1 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001100 [R2 * {square root over (ε_(s))} * cos(41 * π/32.0), R2 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001101 [R1 * {square root over (ε_(s))} * cos(41 * π/32.0), R1 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001110 [R2 * {square root over (ε_(s))} * cos(43 * π/32.0), R2 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11001111 [R1 * {square root over (ε_(s))} * cos(43 * π/32.0), R1 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11010000 [R3 * {square root over (ε_(s))} * cos(65 * π/64.0), R3 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11010001 [R3 * {square root over (ε_(s))} * cos(67 * π/64.0), R3 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11010010 [R3 * {square root over (ε_(s))} * cos(71 * π/64.0), R3 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11010011 [R3 * {square root over (ε_(s))} * cos(69 * π/64.0), R3 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11010100 [R3 * {square root over (ε_(s))} * cos(79 * π/64.0), R3 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11010101 [R3 * {square root over (ε_(s))} * cos(77 * π/64.0), R3 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11010110 [R3 * {square root over (ε_(s))} * cos(73 * π/64.0), R3 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11010111 [R3 * {square root over (ε_(s))} * cos(75 * π/64.0), R3 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11011000 [R3 * {square root over (ε_(s))} * cos(95 * π/64.0), R3 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11011001 [R3 * {square root over (ε_(s))} * cos(93 * π/64.0), R3 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11011010 [R3 * {square root over (ε_(s))} * cos(89 * π/64.0), R3 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11011011 [R3 * {square root over (ε_(s))} * cos(91 * π/64.0), R3 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11011100 [R3 * {square root over (ε_(s))} * cos(81 * π/64.0), R3 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11011101 [R3 * {square root over (ε_(s))} * cos(83 * π/64.0), R3 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11011110 [R3 * {square root over (ε_(s))} * cos(87 * π/64.0), R3 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11011111 [R3 * {square root over (ε_(s))} * cos(85 * π/64.0), R3 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11100000 [R5 * {square root over (ε_(s))} * cos(65 * π/64.0), R5 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11100001 [R5 * {square root over (ε_(s))} * cos(67 * π/64.0), R5 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11100010 [R5 * {square root over (ε_(s))} * cos(71 * π/64.0), R5 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11100011 [R5 * {square root over (ε_(s))} * cos(69 * π/64.0), R5 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11100100 [R5 * {square root over (ε_(s))} * cos(79 * π/64.0), R5 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11100101 [R5 * {square root over (ε_(s))} * cos(77 * π/64.0), R5 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11100110 [R5 * {square root over (ε_(s))} * cos(73 * π/64.0), R5 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11100111 [R5 * {square root over (ε_(s))} * cos(75 * π/64.0), R5 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11101000 [R5 * {square root over (ε_(s))} * cos(95 * π/64.0), R5 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11101001 [R5 * {square root over (ε_(s))} * cos(93 * π/64.0), R5 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11101010 [R5 * {square root over (ε_(s))} * cos(89 * π/64.0), R5 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11101011 [R5 * {square root over (ε_(s))} * cos(91 * π/64.0), R5 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11101100 [R5 * {square root over (ε_(s))} * cos(81 * π/64.0), R5 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11101101 [R5 * {square root over (ε_(s))} * cos(83 * π/64.0), R5 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11101110 [R5 * {square root over (ε_(s))} * cos(87 * π/64.0), R5 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11101111 [R5 * {square root over (ε_(s))} * cos(85 * π/64.0), R5 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11110000 [R4 * {square root over (ε_(s))} * cos(65 * π/64.0), R4 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11110001 [R4 * {square root over (ε_(s))} * cos(67 * π/64.0), R4 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11110010 [R4 * {square root over (ε_(s))} * cos(71 * π/64.0), R4 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11110011 [R4 * {square root over (ε_(s))} * cos(69 * π/64.0), R4 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11110100 [R4 * {square root over (ε_(s))} * cos(79 * π/64.0), R4 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11110101 [R4 * {square root over (ε_(s))} * cos(77 * π/64.0), R4 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11110110 [R4 * {square root over (ε_(s))} * cos(73 * π/64.0), R4 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11110111 [R4 * {square root over (ε_(s))} * cos(75 * π/64.0), R4 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11111000 [R4 * {square root over (ε_(s))} * cos(95 * π/64.0), R4 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11111001 [R4 * {square root over (ε_(s))} * cos(93 * π/64.0), R4 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11111010 [R4 * {square root over (ε_(s))} * cos(89 * π/64.0), R4 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11111011 [R4 * {square root over (ε_(s))} * cos(91 * π/64.0), R4 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11111100 [R4 * {square root over (ε_(s))} * cos(81 * π/64.0), R4 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11111101 [R4 * {square root over (ε_(s))} * cos(83 * π/64.0), R4 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11111110 [R4 * {square root over (ε_(s))} * cos(87 * π/64.0), R4 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11111111 [R4 * {square root over (ε_(s))} * cos(85 * π/64.0), R4 * {square root over (ε_(s))} * sin(85 * π/64.0)].


11. The method of claim 10, wherein each of the [x, y] bit coordinate positions is rotated by a same rotation factor (from 1 to 359°, inclusive), and/or each bit label is altered by interchanging the 0's and 1's, and/or a uniform swapping of bit positions is applied within each bit label.
 12. An apparatus, comprising: at least one processor; and at least one memory including computer program code for one or more programs, the at least one memory and the computer program code configured to, with the at least one processor, cause the apparatus to perform at least the following: encoding, by a processor of a device, a source data sequence of information bits based on a predetermined structured parity check matrix of a Low Density Parity Check (LDPC) code, wherein the encoding is performed based on frames of the source data sequence, each frame being of a length of k_(ldpc) information bits (i₀, i₁, . . . , i_(k) _(ldpc) ⁻¹), and the output of the encoding comprises coded LDPC frames each being n_(ldpc) coded bits in length, and wherein the structured parity check matrix is represented by tabular information of a format wherein each row represents occurrences of one values within a respective column of the parity check matrix, and the columns of the parity check matrix are derived according to a predetermined operation based on the respective rows of the tabular information, and wherein the tabular information comprises a one of Tables 1a through 1w (below); wherein the encoding comprises generating n_(ldpc)−k_(ldpc) parity bits (p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹) for each frame of the source data sequence, wherein the generation of the parity bits comprises: initializing parity bit accumulators for p₀, p₁, . . . , p_(n) _(ldpc) _(−k) _(ldpc) ⁻¹ to zero; accumulating information bit i₀ at parity bit accumulator addresses specified in the first row of the table; for the next group of m−1 information bits, i_(y) (y=1, 2, . . . , m−1), accumulating each information bit at parity bit accumulator addresses {x+(y mod m)*q} mod (n_(ldpc)−k_(ldpc)), wherein x denotes an address of a parity bit accumulator corresponding to the information bit i₀, and q is a code-rate dependent constant (q=(n_(ldpc)−k)/m), and wherein m is a code-dependent constant and k=R*n (where R is the code rate); accumulating i_(m) at parity bit accumulator addresses specified in the second row of the table, and, in a similar manner as for the group of m−1 information bits (above), accumulating each information bit of the next group of m−1 information bits i_(z), z=(m+1, m+2, . . . , 2m) at {x+(z mod m)*q} mod (n_(ldpc)−k_(ldpc)), wherein x denotes the address of the parity bit accumulator corresponding to the information bit (the entries of the second row of the table); in a similar manner, for each subsequent group of m information bits, accumulating the information bits at parity bit addresses based on a next row of the table; and after all of the information bits of the frame are accumulated, performing operations according to p_(i)=p_(i)⊕p_(i−1), wherein for i=1, 2, . . . , (n_(ldpc)−k_(ldpc)−1), each p_(i) resulting from the operation for a given i is equal to the parity bit p_(i); TABLE 1a (Rate 1/5) (n_(ldpc) = 64800) 30434 15118 35871 1042 34043 34085 42341 18485 44500 24268 28843 51748 21972 30300 24347 46808 8416 11111 41481 32215 4130 867 22576 9928 23980 15170 43863 15038 42905 19719 398 39956 47109 48347 26991 18214 24206 47552 15884 49234 51671 11523 41411 21249 16660 17729 852 21114 22858 19843 10501 37683 33159 15595 43687 9791 41121 30595 50762 36562 30611 6196 16501 1860 19594 45948 42827 9110 2671 44915 51640 33959 16649 37658 45143 11861 37 13823 3703 41861 6198 39321 37404 36745 7515 37433 17583 30253 42537 16920 44989 37745 27350 9903 13623 50660 35965 29455 36432 49774 8755 33362 12907 10543 34407 13960 9808 41065 17820 41780 13846 25968 45228 51694 1005 14230 7622 34849 38545 36256 10235 39642 27136 13787 42968 28454 9406 5612 9674 15364 45347 13550 44977 39547 37964 33817 48680 49571 37335 47548 45117 26148 17828 50113 9061 27964 47828 8518 12777 9523 45788 14839 30154 35408 42366 48162 32305 18501 34537 3974 41796 46590 39195 43248 28063 25179 21119 42374 46860 12591 49973 16248 31005 46401 45858 18919 39056 2622 31398 7488 40408 21230 7021 46583 18669 3999 46160 17929 25853 46018 16689 33374 14070 31593 44601 49986 25832 37105 12112 33290 8907 41215 28842 38633 191 17402 29860 28641 12889 28172 1706 23997 18785 3728 43051 43506 28074 20093 25247 4390 3534 35866 5423 48667 31399 44664 42319 17038 19121 2653 3699 43234 5448 2965 5554 6606 46032 10606 34309 48885 30552 28313 15011 35464 35537 42531 47350 49896 34368 50709 33315 29146 27506 37421 7219 5613 19620 22073 21932 40199 36978 30032 22322 39521 22458 18157 28917 42547 10696 22422 42365 45341 34234 4869 37037 6282 42657 1832 25254 24440 13374 34902 36356 9003 17404 29739 5586 29932

TABLE 1b (Rate 2/9) (n_(ldpc) = 64800) 5332 8018 35444 13098 9655 41945 44273 22741 9371 8727 43219 41410 43593 14611 46707 16041 1459 29246 12748 32996 676 46909 9340 35072 35640 17537 10512 44339 30965 25175 9918 21079 29835 3332 12088 47966 25168 50180 42842 40914 46726 17073 41812 34356 15159 2209 7971 22590 20020 27567 4853 10294 38839 15314 49808 20936 14497 23365 22630 38728 28361 34659 956 8559 44957 22222 28043 4641 25208 47039 30612 25796 14661 44139 27335 12884 6980 32584 33453 1867 20185 36106 30357 809 28513 46045 27862 4802 43744 13375 36066 23604 30766 6233 45051 23660 20815 19525 25207 27522 3854 9311 21925 41107 25773 26323 24237 24344 46187 44503 10256 20038 12177 26635 5214 14191 34404 45807 4938 4173 31344 32043 26501 46725 4648 16718 31060 26633 19036 14222 13886 26535 18103 8498 36814 34600 36495 36712 29833 27396 11877 42861 1834 36592 1645 3649 30521 14674 3630 890 13307 41412 24682 9907 4401 44543 13784 5828 32862 25179 29736 39614 5186 49749 38317 41460 39101 50080 40137 32691 26528 35332 44067 8467 14286 10470 12211 34019 37870 36918 36419 33153 50070 41498 47741 30538 12342 33751 23988 33624 41882 34075 25552 3106 17611 13190 29336 312 5667 35483 35460 16153 37267 28308 50009 46345 34204 32756 38243 5657 24157 36834 6890 49576 46244 43875 16738 47225 2944 36882 30341 48485 3700 14451 20438 18875 13634 41138 42962 46459 13369 27974 21493 14629 2369 11351 40226 42457 34749 39000 3912 18128 46776 47055 2221 26806 11345 35143 630 2229 44009 41295 34646 32163 16657 26544 31770 23641 43623 45826 10902 39490 7514 20480 28511 11429 19834 35430 50112 38163 5738 16191 16862 6783 6085 39149 34988 41497 32023 28688

TABLE 1c (Rate 13/45) (n_(ldpc) = 64800) 15210 4519 18217 34427 18474 16813 28246 17687 44527 31465 13004 43601 28576 13611 24294 15041 503 11393 26290 9278 19484 20742 13226 28322 32651 27323 22368 15522 37576 20607 20152 19741 26700 31696 21061 35991 44168 27910 31104 34776 38835 45450 40002 31522 7807 26330 2410 44983 15861 39215 14631 42584 26502 41864 27885 32276 29049 16878 37480 42550 38795 13012 7912 4058 23869 3325 42889 19921 13826 40323 18162 10005 35100 5483 7629 35166 1239 10772 5289 286 16172 41843 42612 38493 11997 40340 19047 16236 43557 9104 24032 2915 19265 36209 6443 40947 43527 29675 4195 31926 35392 20400 7515 45806 36068 33079 37325 6301 4580 20492 40934 14478 8238 2425 28901 43602 7224 17640 28259 6850 41859 14006 19132 5690 16223 11575 30562 44797 3759 9833 36529 21084 45546 16044 26763 13559 29092 41595 5726 13733 9164 15354 20145 10655 24076 40883 13424 30325 40589 32367 36270 9286 40151 8501 3871 22109 26239 29805 5358 44835 11609 3899 9760 39600 43422 13295 45431 14515 5392 37010 12386 40193 21492 45146 12376 41952 43153 45733 718 35726 33884 38006 16927 20958 25413 44561 11245 12984 35198 30977 31916 10657 1412 1048 14965 31879 29967 41000 32087 22 34773 768 27289 19898 43051 6964 31807 4119 33509 15950 6304 2813 35192 38282 39710 26356 9889 18957 6355 18770 40381 1876 38889 17958 20309 10744 1744 228 41543 36505 32795 12454 8520 4916 22313 1363 13010 8770 17057 8694 22987 29564 13804 3110 1382 33844 15117 42314 36045 25295 28421 22044 15951 42952 17458 6926 21257 41243 8662 17046 15054 15302 16964 40079 13359 45754 16715 9586 10960 25406 14675 8880 5087 12303 28993 13571 24824 31012 4121 808 30962 28736 11013 20488 7715 7637 6217 25114 23615 5760 5554 18072 21605 39242 24190 6592 12281 44681 6563 7001 18291 19605 33476 2884 30927 18430 23674 36414 30649 15364 22089 19757 41162 14454 17627 16676 28573 22163 8851 36803 27589 40049 476 1413 41013 34505 33296 29782 38018 42124 22625 7485 11772 2052 37567 14082 30106 43203 20858 7399 3796 22396 38745 792 44483 28268 33355 41030 30098 37269 12871 35769 33119 16738 3307 43434 13244 17852 9133 23190 35184 20115 24202 14760 43026 19425 26414 16821 6625 30362 35769 42608

TABLE 1d (Rate 9/20) (n_(ldpc) = 64800) 30649 35117 23181 15492 2367 31230 9368 13541 6608 23384 18300 5905 1961 8950 20589 17688 9641 1877 4937 15293 24864 14876 6516 10165 4229 26034 28862 8265 27847 3 22728 13946 27162 26003 17696 13261 31719 25669 17149 17377 33106 12630 4814 16334 1480 32952 11187 3849 30186 20938 7946 23283 11042 28080 26642 34560 11302 4991 5121 6879 13445 22794 18048 15116 5657 9853 15581 34960 13240 11176 17937 25081 4868 28235 30286 29706 7073 6773 10390 27002 13015 7388 14772 19581 11765 16642 11431 19588 20154 8027 29758 5501 6398 4268 21337 21136 2275 7899 25943 12939 14478 20369 22877 3591 12217 19130 24252 32444 24599 21382 4689 3524 11304 20423 13677 19639 10577 28279 22330 30722 21622 26233 3921 17722 6843 5999 8186 2355 33632 34632 30285 9616 19909 30417 19587 27853 13896 3689 155 20457 33362 21739 22779 33862 3713 32975 9403 2836 23109 11099 3505 14562 17309 26470 4843 12279 24216 26340 22073 32570 12936 19797 21801 8918 7999 24408 5783 25190 8817 29367 17017 6208 21402 2280 2110 7975 32039 34605 1235 912 23116 33017 31405 638 4707 31760 18043 3507 11989 26632 32829 11262 9274 2553 10697 13507 15323 27080 3752 33191 12363 24664 14068 1416 21670 26696 18570 25197 1517 7765 32686 6572 30901 28242 17802 24056 35388 26895 8023 31249 29290 13440 7156 17367 21472 27219 14447 9655 11100 27918 2900 33262 15301 4664 15728 1185 24818 32995 31108 16368 34978 31690 30464 13044 5492 10047 2768 14336 30880 32780 10993 24750 7022 19718 26036 19145 21177 33949 17135 5193 33718 2539 13920 25537 918 18514 14530 13699 11902 22721 8335 35346 24655 3332 14708 20822 11191 24064 32825 12321 11771 23299 31325 25526 16785 22212 34075 9066 31209 27819 5974 19918 26831 33338 26647 9480 28489 7827 18562 2401 17395 23192 10277 28458 23028 18793 10463 10740 616 24647 4153 10128 2873 22381 8132 18239 31614 4193 32313 7575 25801 27591 19872 17992 4609 9114 14764 13516 19192 9882 13112 16075 12510 28902 8784 32679 4578 34533 30609 25543 13739 3465 5330 999 33254 13085 5001 29061 28369 79 17750 13399 24851 9524 30966 10422 18251 34810 12259 25103 25193 16945 1059 11266 13612 30508 24778 25364 1322 14492 11111 13693 15125 8205 1749 8494 9902 9395 23936 3981 22799 28448 28076 26544 19652 13424 8915 2885 11356 3241 1609 10284 24350 2462 19358 15717 29327 15960 14743 5388 32927 1288 19074 6322 32214 34208 30535 35462 23415 20836 21819 17986 12196 30030 8422 2647 5710 3200 23132 23337 22307 29841 4813 15309 26942 29970 23288 7493 3005 20661 34283 33192 23033 9541 6424 22003 24665 5534 4684 1411 33340 26042 6426 3808 285 21942 14302 16023 6825 20084 34878 12295 32028 2591 178 24107 16379 2912 9912 15375 16120 28375 20170 726 11291 8185 13471 8448 23205 14239 17896 17950 19308 1591 3170 23836 18879 12853 10678 18431 21157 31624 3153 27682 12433 3458 312 4844 13138 17715 35138 15456 30507 33307 30783

TABLE 1e (Rate 19/36) (n_(ldpc) = 64800) 4852 21528 7920 5827 25497 26912 13790 5647 5349 26209 30575 10701 15230 6020 12821 18153 28229 23784 7846 2405 6175 25057 24745 11338 20902 7232 5966 20079 11898 7024 17575 30172 23114 7408 1444 10470 21964 6794 1849 19639 42 2805 10297 14296 17686 18756 6814 9207 13761 23515 17223 21044 557 5255 27297 13440 21226 26060 28875 300 8454 396 27979 25998 8734 9820 22370 3875 26358 26384 12591 26114 29610 12183 15722 29971 5804 10489 2548 29277 13097 19843 19372 19804 12467 2412 3711 4225 15202 24051 29399 5140 19293 5563 5975 10604 8722 11230 8796 6205 27377 23788 7237 16738 14133 11767 12239 7354 27329 14432 12580 11872 15339 16324 5281 2272 15919 18405 23238 3644 20037 7221 19740 14881 9948 21458 21721 20274 632 7531 22448 29320 28575 1484 1684 23572 314 17511 10742 23432 6120 1756 13668 831 23308 709 12194 11481 15426 16126 27391 12597 14490 15204 11820 11558 15988 14707 14715 28040 27022 2964 11343 9853 20469 20448 7921 30386 8030 10079 10797 9471 12773 12408 22081 27431 11141 647 5583 4867 19597 9640 21448 7774 22031 978 14982 9318 5329 23331 747 1599 24719 13982 10148 22796 19316 16641 13398 1385 11074 21429 27365 15030 17211 3435 3121 19692 22379 14270 22290 12713 25821 29202 30112 23466 418 19299 5266 19721 19875 4120 27217 3456 12505 29571 29323 1359 29271 18848 23988 3711 27838 30064 9471 15792 13372 25101 28859 3582 24067 921 10735 1252 24500 16866 9523 24035 25043 22577 6407 20445 8841 13840 17428 23024 13023 27418 13669 2039 5284 4272 20790 12124 14854 8589 24186 2542 124 11300 10583 13607 8364 7702 22179 8034 18294 25817 9609 29141 26471 28410 0 28693 25766 12550 25246 15174 21691 27153 3960 7108 15248 8867 8637 7526 25098 25457 9549 4919 29817 17975 29608 12231 5214 13215 7529 3174 28008 29496 12796 3906 11660 28238 4295 24868 28946 3822 14643 7700 8772 4564 25809 28687 16723 12784 545 1026 24533 10526 2781 18949 19829 11457 8993 22179 15321 4961 2623 2304 7882 9519 1755 19477 14008 20611 17807 13434 20328 25809 15475 20333 14032 22015 9478 521 7297 11756 11083 30411 6101 23078 13808 7653 3799 14951 12091 8232 4961 10525 4842 4867 13342 20032 9328 14808 11890 9097 1406 17654 21576 13916 19328 21178 9578 4949 26018 16604 13328 21777 18932 7321 2070 7697 14266 9879 12271 19185 26947 14798 20341 18010 753 12687 20366 16795 22301 4021 24333 15105 8536 13240 28609 17761 5504 518 17937 3329 3001 25432 26541 3002 3436 16197 9838 15328 16775 26537 2795 25184 7045 17243 22843 12232 10984 15198 11963 17345 12186 18466 29254 26266 21216 1565 17729 29158 7355 4837 1356 28911 6749 26024 20177 19405 24682 20539 23639 23171 19707 1278 1465 17435 10327 16584 14678 15700 28585 6210 24813 1477 19918 7305 17774 20937 30288 20203 23788 21655 16483 18985 17501 28765 13494 25663 1925 12695 7109 16881 2053 12382 4765 11370 13410 10697 9692 29500 21773 16350 12204 23752 14420 29567 3862 8483 5243 12830 24323 27405 20033 30085

TABLE 1f (Rate 11/20) (n_(ldpc) = 64800) 20834 22335 21330 11913 6036 15830 11069 10539 4244 15068 7113 2704 16224 2010 5628 27960 11690 22545 24432 4986 21083 17529 4104 11941 21239 9602 689 13248 1777 4876 2537 20869 15718 9575 18164 5294 13914 21711 23374 9675 21239 13600 24710 10613 14804 19412 23270 26741 10503 25258 17816 25210 12518 8680 6422 22715 25097 26959 3913 26493 7797 25977 4896 27063 20781 21715 12850 7963 4027 4295 14931 18158 616 20570 8720 16487 19050 23925 7939 21089 15170 24325 6651 22352 5633 27903 2685 1310 5594 9296 25670 25121 13906 8217 25390 9112 13945 9826 10844 11418 10724 11518 9280 9576 25979 23644 16073 27407 3476 28057 4003 2279 17490 7558 9538 22115 20439 20708 22572 14997 15780 5159 11356 10931 8514 23275 2560 912 15935 20703 26467 17173 21964 15469 21967 10380 16222 15106 16786 19542 28560 18387 27909 14897 6167 24295 1266 16902 9546 11628 12048 24495 3706 22629 14165 2333 19403 18738 28140 13141 6151 22785 9620 4290 2342 4902 15856 19033 22820 15761 1985 9160 4435 11164 5442 23572 6951 19077 15406 16658 18324 19229 16997 10094 19982 22821 7810 19660 1182 21968 16564 17453 10780 17034 16405 11 28611 10411 15799 15705 2773 28601 19333 19447 16790 4618 15841 23854 24686 4131 1013 2141 6052 11896 18719 16813 22420 23406 21052 4333 17754 16425 17614 26883 12101 8224 13979 6869 25215 25991 28968 19337 25361 20513 1671 14990 20692 24951 19446 7163 4959 13197 19201 3883 22532 15468 11856 22758 23586 16985 18396 7434 11817 363 11824 285 20897 16646 16095 17011 25144 14916 6302 20972 25439 6156 21776 19701 27803 9695 12941 23541 27425 6979 27910 7378 8983 6280 4134 28860 8079 20892 28776 7899 23399 87 18045 23929 25876 15560 23629 18376 4053 14655 2450 11907 19535 28543 3513 4704 16512 16554 14062 2596 10357 17316 1011 22090 11353 20300 15300 18536 14293 4746 28831 20028 16742 16835 28405 11245 10802 20242 17737 9590 20693 26547 22557 22517 6285 5336 3998 2351 6628 22949 1517 4712 1770 9207 28522 14116 5455 13105 18709 3030 4217 6306 27448 1943 23866 20212 18857 14794 21425 15659 4446 21140 13454 21115 3271 1443 2153 12424 6159 23559 22473 26065 15914 22980 12766 3482 16233 5719 27020 12322 24014 25438 26499 26506 21987 16027 6832 17330 2620 20756 15985 10471 23302 593 6869 27185 22961 9129 25646 10702 12334 23959 6375 23299 26942 8029 4072 24051 15147 5113 14725 1451 27291 28731 18808 11561 249 28962 21405 18944 6889 3314 23457 27708 14530 8795 6185 28821 6550 2259 17627 701 20819 18831 20140 4991 11369 4282 13230 3413 27092 14556 5068 16209 4337 24652 498 715 28883 2285 16524 25513 26034 21067 15122 21667 27982 15280 3313 7563 22779 22453 4744 17277 27210 19170 10806 18815 26424 26442 7837 26264 28931 6020 4645 20678 13160 18111 28045 23883 5128 10876 3087 28551 26276 3541 20152 10181 28172 26430 14769 6809 4956 16130 11348 1691 10216 5743 7848 20236 2661 10660 8321 6155 2757 6963 2596 27791 6707 258 12785 21176 15450 7477 17274 25201 262 18996 15836 5287 11970 13365 3098 17823 10786 21831 14476 11447 1893 3625 25404 20880 21987 1228 20942 15045 21358 18237 28914 15673 24273 284 9803 13949 15670 16693 15553 27782 22644 27980 24820 27733 7015 20974 10016 26164 20314 25916 11489 13663 11777 18230 11483 5655 1618 19977 26521 25639 13184 28994 3821 18349 13846

TABLE 1g (Rate 26/45) (n_(ldpc) = 64800) 12918 15296 894 10855 350 453 11966 1667 18720 12943 24437 8135 2834 11861 3827 15431 8827 8253 23393 15048 5554 16297 2994 6727 19453 2371 26414 3044 20240 18313 11618 3145 10976 5786 5609 16358 2547 11557 14755 26434 2510 26719 4420 6753 917 7821 26765 11684 9811 5420 6653 19554 11928 20579 17439 19103 21162 11235 19172 22254 3420 10558 3646 11858 24120 10189 8172 5004 26082 4345 5139 15135 26522 6172 17492 8462 4392 4546 27330 21498 13424 8077 10165 9739 482 23749 1515 12788 10464 9085 20875 12009 22276 18401 7541 5871 23053 16979 16300 13566 19424 5293 18290 23917 9613 24175 11374 11736 17676 13126 20931 20290 20659 2000 7969 9386 21507 24494 11822 21771 26776 21175 27354 15815 7598 19809 611 10144 195 14244 7229 13002 14328 17987 14595 6985 7642 9434 7079 5571 10013 3641 14064 11716 4620 18119 23365 26446 26273 25164 11262 26019 15166 19403 5606 20138 1893 645 5414 12097 18635 21648 12255 13269 1895 9969 8372 17737 21679 17061 20219 2513 27199 11242 17025 1261 12845 13086 16256 15177 20822 10862 18375 6751 17532 24725 6966 18489 8373 25550 20688 16686 7894 24599 21578 12516 7115 4836 23473 25162 14375 9150 6606 21633 16224 23708 20350 4575 143 13356 10239 22868 10760 19807 7079 16382 26236 22606 16777 24312 16941 26684 8658 19279 15136 8603 332 2898 21821 23778 3232 12052 14336 7832 5600 27015 14392 26564 21616 8332 21750 10379 19730 7553 27352 2718 15202 25661 6891 13210 15284 21940 8742 10965 3176 25034 25137 25161 13267 7012 4993 9943 13260 20980 20224 20129 2120 23111 16640 23548 21445 10794 4846 2858 22663 12584 20448 4629 17825 22269 11278 26312 9463 21085 24282 18233 9220 14979 24106 14507 24838 19689 17589 7926 7893 21701 12253 26122 8035 20823 2584 4703 25178 5460 4190 7057 1144 8426 12354 7216 19484 4110 22105 1452 11457 12539 27106 14256 14113 20701 2547 26926 25933 11919 12026 24639 19741 15457 9239 26713 22838 6051 8782 14714 23363 450 19972 2622 19473 24182 2391 26205 10018 9202 15690 10472 20263 469 18876 23660 9005 12595 23818 26430 926 6156 5440 5209 14958 9882 18843 22063 12749 18473 22546 11768 4493 12833 18540 3544 9471 15893 14761 23479 22010 15491 19608 25035 9094 24836 15909 16594 23538 25136 25063 24995 5354 905 18580 15476 20710 7774 6088 17133 11498 4721 17594 18267 1645 23638 26645 14800 17920 22016 12927 350 19391 19447 19886 25992 26120 1747 11234 1588 23170 27232 2230 15468 18709 17410 11055 20645 3244 25815 14204 2858 7980 12780 3256 20418 24355 24260 16245 20948 11122 1503 15651 19272 24054 6075 4905 931 18884 23633 17244 6067 5568 26403 490 16113 16055 10524 23013 8138 12876 20699 20123 15435 27272 27296 22638 7658 17259 20553 14914 17891 12137 16323 1085 18895 21503 17141 2915 21979 23246 1271 14409 11303 12604 25591 12157 14704 18739 19265 8140 11244 5962 6647 3589 6029 6489 16416 185 9426 1267 14086 22473 17159 22404 23608 7230 22514 21605 7645 1239 10717 12028 13404 12140 14784 15425 14895 26165 18980 15386 14399 7725 14908 8463 22853 22095 5517 1854 8283 24381 260 12595 839 23743 22445 13473 8017 7716 8697 13050 16975 26656 16911 11972 26173 2504 15216 7493 6461 12840 4464 14912 3745 21461 9734 25841 4659 7599 9984 17519 7389 75 12589 9862 8680 23053 21981 25299 19246 3243 15916 21733 4467 26491 4959 10093 20074 9140 15000 12783 854 10701 25850 13624 7755 10789 3977 15812 10783 5830 6774 10151 21375 25110 5830 15985 18342 2623 4716 27211 18500 18370 12487 7335 4362 21569 16881 10421 15454 13015 5794 1239 9934

TABLE 1h (Rate 28/45) (n_(ldpc) = 64800) 24402 4786 12678 6376 23965 10003 15376 15164 21366 24252 3353 8189 3297 18493 17994 16296 11970 16168 15911 20683 11930 3119 22463 11744 13833 8279 21652 14679 23663 4389 15110 17254 17498 13616 426 18060 598 19615 9494 3987 8014 13361 4131 13185 4176 17725 14717 3414 10033 17879 8079 12107 10852 1375 19459 1450 4123 2111 17490 13209 8048 15285 4422 11667 18290 19621 2067 15982 304 8658 19120 6746 13569 19253 2227 22778 23826 11667 11145 20469 17485 13697 3712 4258 16831 22634 18035 7275 23804 14496 17938 15883 14984 15944 2816 22406 22111 2319 14731 8541 12579 22121 8602 16755 6704 23740 16151 20297 9633 1100 19569 10549 19086 21110 11659 6901 21295 7637 11756 8293 9071 9527 9135 7181 19534 2157 788 13347 17355 17509 711 20116 21217 15801 12175 9604 17521 2127 21103 1346 8921 7976 3363 11036 5152 19173 8086 3571 1955 4146 13309 15934 19132 5510 12935 13966 15399 16179 8206 19233 16702 7127 12185 15420 1383 6222 6384 20549 18914 23658 11189 638 9297 17741 9747 13598 17209 11974 20776 2146 9023 3192 19646 3393 1727 15588 20185 5008 3885 5035 15852 5189 13877 15177 3049 22164 16540 21064 24004 10345 12255 36 24008 8764 13276 13131 2358 24010 16203 21121 21691 8555 11918 129 8860 23600 3042 3949 19554 12319 22514 11709 11874 11656 536 9142 3901 580 1547 10749 5529 3324 6251 1156 112 13086 5373 5119 132 18069 10482 19519 17279 2017 14846 21417 17154 21735 18788 11759 192 16027 6234 20417 3788 15159 22188 21251 16633 13579 8128 1841 23554 15056 12104 9182 6147 1553 12750 4071 6495 4961 18460 23266 10785 10973 4405 2707 7665 7043 1968 3589 15378 9642 21148 13073 13298 20040 13582 17124 348 12055 378 7476 9838 15454 5218 14834 17678 3445 18453 2767 388 12638 5688 56 6360 20009 872 16872 10206 5551 477 10662 23689 19768 8965 17535 4421 19397 18734 5422 10043 22104 21682 508 1588 23853 1092 7288 4358 2283 22298 10504 15022 8592 22291 11844 17038 2983 17404 14541 6446 20724 7498 2993 14715 9410 6844 20213 14674263 4822 20951 635 20651 23174 5057 22237 9229 4859 17280 9586 20334 19508 8068 11375 5776 21209 9418 6872 6349 20397 11165 19619 13108 13550 10715 5122 5655 10699 8415 9864 4985 7986 6436 3754 7690 4257 17119 5328 659 4687 6006 527 10824 8234 11291 1735 22513 7254 2617 1493 3015 7462 10953 15705 2181 11992 4628 19430 18223 9426 21808 13549 17008 3470 22568 13643 24195 21816 936 14226 22874 6156 19306 18215 23984 14714 12907 5139 18639 15609 11908 5446 8958 6315 16864 15814 10686 22570 16196 203 4208 13716 494 14172 11778 15112 14244 8417 21087 4602 15570 19758 4401 22270 8218 11940 5009 23833 13785 12569 1698 7113 18541 18711 19991 19673 8025 17107 14784 5954 6817 19810 24143 12236 18063 23748 23956 10369 7805 13982 13861 5198 10889 6787 10406 13918 3305 12219 6523 12999 9964 2004 17361 23759 21507 11984 4188 19754 13358 8027 3662 2411 19762 16017 9125 2393 4619 5452 24176 6586 10895 15872 1795 15801 6911 15300 14787 2584 4905 8833 1327 12862 9476 16768 12633 7400 11983 6276 18370 12939 12793 20048 20284 12949 21345 19545 4503 16017 1253 12068 18813

TABLE 1i (Rate 23/36) (n_(ldpc) = 64800) 2475 3722 16456 6081 4483 19474 20555 10558 4351 4052 20066 1547 5612 22269 11685 23297 19891 18996 21694 7927 19412 15951 288 15139 7767 3059 1455 12056 12721 7938 19334 3233 5711 6664 7486 17133 2931 20176 20158 9634 20002 13129 10015 13595 218 22642 9357 11999 22898 4446 8059 1913 22365 10039 15203 10305 22970 7928 16564 8402 9988 7039 10195 22389 5451 8731 19073 1005 18826 11109 13748 11891 21530 15924 21128 6841 11064 3240 11632 18386 22456 3963 14719 4244 4599 8098 7599 12862 5666 11543 9276 19923 19171 19591 6005 8623 22777 1255 20078 17064 13244 323 11349 6637 8611 6695 4750 20985 18144 5584 20309 6210 16745 10959 14284 2893 20916 10985 9664 9065 11703 17833 21598 22375 12890 10779 11241 13115 9222 21139 1217 15337 15514 12517 18953 11458 17296 8751 7213 12078 4994 4391 14976 3842 21548 10955 11679 16551 8514 17999 20557 16497 12122 23056 10551 20186 66 11038 22049 2130 1089 22093 9069 3470 8079 19208 22044 2732 1325 22309 967 22951 1366 11745 5556 6926 2805 18271 10046 4277 207 19518 17387 9701 8515 6813 10532 19714 21923 13493 1768 18819 6093 14086 13695 12781 9782 445 22160 15778 13629 10312 19769 8567 22096 15558 19730 11861 18492 10729 16847 273 4119 4392 11480 20396 3505 7220 390 5546 17277 8531 17390 22364 7167 2217 7325 3832 19899 21104 8400 3906 6218 20330 14943 14477 5614 1582 21534 14286 14624 14809 6775 22838 15786 6527 15848 5288 13523 9692 12696 15315 602 17081 6828 13578 3492 6510 20337 6113 5090 7290 20122 15539 19267 10412 19090 17863 2546 2295 19448 20296 2296 2627 6740 14224 10460 12878 6055 15452 15152 15699 563 15414 21900 19161 11126 15975 3733 4379 15742 6475 17203 5870 18537 4912 260 21115 23164 4273 1694 1082 5287 11152 14537 2277 19232 13414 15608 12926 17043 18241 18313 208 6118 20777 9140 19241 22845 18527 5035 4161 20867 22650 5585 7875 10358 1898 3563 14833 21329 14705 3359 13959 4507 11976 20017 22424 12925 8308 8739 15561 8010 6408 20723 20928 12337 7864 15777 12742 20430 17351 6259 1865 9808 8343 17441 2551 2167 3025 23181 22718 13243 4797 4223 4982 4395 1609 16748 17625 8463 15204 19632 6583 9112 20284 11334 19370 4763 746 18560 15222 8796 12725 15176 10245 15567 9991 17447 18373 21523 1473 5286 15793 17675 21170 6699 15515 15942 8733 7047 11348 14584 20435 19603 1961 18851 7069 11402 19180 6487 2979 2650 13282 9040 22613 23266 4786 20832 3001 23129 3850 5255 6601 19827 15438 13956 15798 4430 11318 4724 8719 21209 18127 844 21379 7427 22987 10233 22949 8145 21778 7622 14471 18874 8566 14340 3381 3373 419 11514 15127 917 13136 19375 18740 4951 960 2856 17804 662 8107 10298 10993 11755 19142 11400 18818 521 7210 18658 8285 9496 20836 5655 14654 13694 12705 20381 16473 7271 12796 3280 23370 13893 7667 1736 5485 18321 7789 11242 18771 17282 817 21060 15985 666 20461 22464 7696 19774 4324 12239 14014 4759 5011 10472 4137 3047 2444 3818 1594 20382 538 7051 21874 1697 18539 26 21487

TABLE 1j (Rate 25/36) (n_(ldpc) = 64800) 11863 9493 4143 12695 8706 170 4967 798 9856 6015 5125 12288 19567 18233 15430 1671 3787 10133 15709 7883 14260 17039 2066 12269 14620 7577 11525 19519 6181 3850 8893 272 12473 8857 12404 1136 19464 15113 12598 12147 4987 13843 12152 13241 1354 12339 4308 23 12677 11533 3187 11609 4740 14630 19630 14508 10946 3928 580 3526 17836 3786 15739 13991 1238 1071 6977 13222 13811 585 8154 2579 8314 12185 15876 7738 5691 12901 12576 11597 4893 17238 15556 8106 12472 10455 14530 17432 8373 12875 16582 14611 14267 15093 2405 9342 18326 12125 9257 5861 12284 2441 13280 2762 5076 17758 4359 6156 18961 13208 4400 8474 19629 19528 14125 12780 12740 19316 491 4761 1719 7270 6615 1175 15848 6943 18360 8905 13921 10807 19688 18757 8312 12234 17907 17254 7699 18399 5508 12215 4818 18107 2874 19496 13973 10432 13445 15320 13648 1501 10549 6710 8897 1998 1575 12713 10916 5316 13713 11318 4055 5782 5828 17981 3141 12177 10726 4244 3138 15996 6822 7495 5257 8909 6180 10680 6650 1909 19146 1038 17229 10050 3051 9793 10839 3532 14759 5337 8448 4939 14792 7585 17860 8612 2229 18965 1519 2031 13845 9320 579 15441 15050 752 8303 6989 13360 12927 15255 17286 3639 1733 16883 8457 9475 2939 3234 1993 8554 9939 6359 15474 12100 6992 13844 16988 7481 16977 9052 9262 15270 7181 3624 3814 16379 182 4338 17627 3315 5745 14093 15574 10709 18662 6909 11248 5268 412 5854 16782 16059 10498 5061 13321 617 6734 3718 15441 19241 17214 1682 18641 18646 6330 7377 16951 14477 6507 9922 11464 2563 5702 12691 10606 17874 7198 12571 17617 4862 18899 7100 8130 9665 10779 6789 11459 17651 3693 13332 3854 7737 12589 15189 16260 14569 9442 17890 18097 6845 6960 1376 8099 12719 14986 18999 14013 3449 13618 14807 265 1508 11231 966 15957 8315 3384 2570 5700 10911 17372 153 8445 19598 7841 14806 54 2492 14099 11718 18608 4278 333 59 3982 16986 3494 12496 2775 18320 10650 16234 9739 16537 19706 7587 19072 18775 14133 12042 2922 229 17958 15889 5130 11029 271 5122 7021 7067 12258 16611 9245 15493 15347 15939 741 12055 2822 12804 3480 5690 18598 19273 16354 2569 16771 13693 15051 853 956 12256 2756 15137 15685 2802 16479 14687 12470 3583 15473 17781 867 4843 6765 13122 11287 3680 19101 4609 11385 13470 12353 6632 206 10984 3116 1263 9419 14455 19438 9528 1808 435 2238 12870 10119 10868 8402 11111 11081 7197 2667 13780 10759 19722 3768 3052 1836 446 1642 12388 16876 8398 14485 7301 14815 13811 5678 10419 14396 1877 14384 12817 19028 19589 6893 8725 6346 676 13611 12486 2054 11203 14908 14692 18139 5334 1253 16233 9749 16946 18885 4332 16306 3862 10395 13871 3747 8900 3381 13367 14132 7220 15095 4219 15869 13519 18079 17541 19012 13943 19471 2221 5710 13711 5185 3363 10195 9580 17331 15360 14387 7596 9614 17336 6371 6030 14629 10636 10159 2402 9170 4321 1040 5899 153 7710 7637 13966 10919 8535 3791 1968 2567 4986 4166 8744 17691 540 10695 10019 17710 1188 10821 5858 17012 17389 3083 17587 12682 5354 9537 6807 4964 15942 9653 9000 17053 13291 11685 8503 10777 13919 18155 9877 1625 15314 13879 18520 7074 17061 3748 2752 7298 493 19163 14139 2260 18339 10688 8928 17695 10276 7640 18547 3561 11275 5297 13167 19691 19542 15725 11837 7273 11297 17873 7840 19563 8109 3811 18417 17759 17623 13175 10041 4152 2249 18452 1450 19309 9161 11651 4614 11547 14058 639 9384 3272 12368 5898 2578 14635 15963 6733 11048

TABLE 1k (Rate 13/18) (n_(ldpc) = 64800) 2510 12817 11890 13009 5343 1775 10496 13302 13348 17880 6766 16330 2412 7944 2483 7602 12482 6942 3070 9231 16410 1766 1240 10046 12091 14475 7003 202 7733 11237 15562 4695 13931 17100 11102 770 3848 4216 7132 10929 16469 17153 8177 8723 12861 15948 2251 1500 11526 8590 14813 3505 12654 1079 11736 6290 2299 17073 6330 5997 390 16492 13989 1320 14600 7061 6583 458 894 1596 8625 7644 1322 16647 15763 10439 8740 5529 2969 13893 13425 13121 5344 8739 4953 7654 17848 9334 9533 2731 12506 10992 8762 5395 6424 11688 3193 17601 14679 8204 5466 15487 1642 6671 13557 4074 7182 4436 12398 12973 1958 13041 6579 15984 3762 16633 6113 11509 7227 28 17202 4813 14024 15099 2648 4476 2260 6507 9930 9232 14186 14510 6818 7665 12708 2645 16687 13255 8239 15884 1751 7847 17987 11410 3345 17133 17655 5027 1261 17191 8056 4264 13915 8217 6118 8072 6278 6835 5038 15008 13625 2999 5336 11687 13500 5723 13903 766 6293 155 12316 14093 7372 16846 15357 9865 17869 1429 16681 202 15062 1123 6454 17625 3213 39 1669 1770 13636 16555 13053 7597 11481 1336 3343 11387 5463 17830 13741 5976 1956 13509 1664 16867 8168 13421 17078 3285 17138 1572 16711 1499 4805 13584 14759 2844 13110 7356 5850 8330 6521 8528 14170 6681 16992 12867 14326 15227 4082 8595 16176 8184 8572 1923 935 8900 13020 6812 9778 3391 3946 4711 15314 15108 15634 4144 4372 9207 10715 1291 16601 5864 10968 4724 9235 6988 3307 6515 7004 16328 16217 4227 9735 15857 5003 2532 4451 8574 2149 6908 9506 8949 12035 9701 3124 14295 8567 13614 5159 16746 2418 8669 10921 5738 147 1004 2692 9065 12877 7559 16706 8511 10314 3118 1219 7071 12376 538 2389 3297 12492 10589 5791 13528 1653 6618 10485 1307 4102 347 13580 4039 523 10311 10540 4183 6192 17159 11458 6521 9632 11594 15791 10384 11654 126 11715 6265 34 5091 7271 13900 7588 3960 11297 1612 9857 4695 16399 6423 2197 15040 4219 5979 13959 2959 578 8404 4585 658 6474 15900 11357 5249 7414 8642 1151 4130 9064 14537 14517 1356 3748 13865 12085 17295 9530 5110 1570 10862 8458 15322 16355 1774 5270 1229 11587 1632 17039 787 4703 11423 15388 6136 8413 9703 13946 4678 4072 16702 6244 4690 7164 7238 14169 5398 8679 122 11593 10954 15802 16427 9413 6717 16406 1027 17863 7836 655 8827 10286 4124 12599 12482 12955 3121 15318 8343 16634 6301 13568 5056 9920 1948 10 17395 8550 131 2151 15226 15994 13093 10966 15412 2781 13425 15831 5346 2261 1067 6346 6625 1966 13533 10575 4483 5761 14366 2019 14426 16746 1450 4830 13109 7358 7942 15376 7284 14035 14341 12625 3306 9375 7529 1537 13831 13447 4549 15658 15299 8238 4005 13264 9766 4715 6285 15383 1262 12883 15434 11123 14975 3434 5307 1112 16967 12163 12009 3681 9174 13153 10344 13456 13197 9562 1785 7549 15347 663 9748 9436 4961 11903 11574 16248 6238 666 11426 13748 14763 14431 1443 2069 2376 8154 14978 13140 1289 9046 1159 300 3319 11510 7769 15877 6430 14946 6856 8868 15622 12458 4867 6622 6850 14721 11241 12760 14233 9874 17682 16677 13195 15086 11155 7067 14160 12741 14379 8922 1930 17055 11752 12361 6523 9568 12165 5636 16011 11389 4754 9916 15903 15542 8301 12073 4918 9754 16544 17907 14814 10839 1401 5107 12320 1095 8592 15088 6521 12015 14802 3901 8920 17932 2990 1643 5102 3870 2045 540 2643 2287 5844 2482 9471 10428 637 3629 8814 7277 2678

TABLE 1l (Rate 7/9) (n_(ldpc) = 64800) 13057 12620 2789 3553 6763 8329 3333 7822 10490 13943 4101 2556 658 11386 2242 7249 5935 2148 5291 11992 3222 2957 6454 3343 93 1205 12706 11406 9017 7834 5358 13700 14295 4152 6287 4249 6958 2768 8087 1759 11889 4474 3925 4004 14392 8923 6962 4822 6719 5436 1905 10228 5059 4892 12448 26 12891 10607 12210 10424 8368 10667 9045 7694 13097 3555 4831 411 8539 6527 12753 11530 4960 6647 13969 3556 9997 7898 2134 9931 3749 4305 11242 10410 9125 9075 9916 12370 8720 6056 8128 5425 979 3421 5660 9473 4348 11979 5985 395 11255 13878 7797 4962 13519 13323 7596 5520 2852 8519 3022 9432 3564 9467 8569 12235 11837 5031 4246 2 4081 3630 1619 2525 3773 11491 14076 9834 3618 2008 4694 6948 7684 9642 5970 1679 13207 12368 262 7401 11471 2861 5620 4754 7474 10418 1422 10960 13852 988 13465 6415 86 2432 7595 12239 8539 11749 8794 6350 1947 13325 13061 7385 13017 2536 13121 15 7944 13831 5126 9938 11758 335 980 9736 12143 5753 4533 10814 10706 12618 6949 2684 4107 14388 11372 6321 13832 9190 2838 13860 10830 1947 13803 3257 2677 406 8400 10536 12911 3629 251 9784 13343 13304 301 801 6456 6351 6155 6763 3812 11337 8446 9306 524 5573 503 10544 8990 673 2309 12376 466 11441 960 1557 4403 3564 1732 13453 12054 8941 1383 12424 4347 9830 3553 5158 2025 4282 4983 13553 10776 11833 13099 5078 4420 3527 1544 7474 2780 7749 4153 11189 520 8463 12230 7712 10409 13367 2604 2966 9248 1412 420 3507 9818 7955 1122 12483 9375 10232 9456 2799 7033 10404 4495 12059 2569 5970 6262 2199 8045 11724 511 12693 12855 9597 756 12900 13391 13623 10683 2095 13479 1488 9469 11142 13849 1356 10776 3530 9866 13449 14225 2072 12772 9461 6466 6181 6502 401 7439 4631 1086 3062 11789 11811 6788 14007 2270 14132 2764 4643 10272 11316 2608 8511 5221 9028 2736 7223 1051 1974 2737 6739 13904 6156 5 9082 3915 2400 7195 3413 606 221 8171 4548 1267 5310 12795 2160 8305 10563 3507 12190 6325 2499 9717 9251 6046 13308 11704 10834 11241 4777 3774 11533 12487 10365 6852 58 2650 2027 7248 13704 5573 12777 7834 8561 7906 8121 7774 554 3105 6000 11198 3586 10410 9002 4094 11297 12058 1037 13638 1258 12917 11078 2430 51 10276 7841 9451 10236 11045 1058 10352 9629 9428 86 8146 1255 3802 10820 6337 4199 9364 7723 1139 438 6445 583 2683 5358 10730 8471 3061 13380 3005 2840 4754 8210 1814 11502 8667 14258 5985 8407 13336 10970 6363 11715 5053 104 13618 13817 6562 4087 294 1742 10528 4626 6607 2692 1587 11097 8361 2788 13451 3541 823 4060 13604 9816 157 6106 1062 8853 5159 4270 9352 13164 2919 7526 5174 12501 12634 13077 5129 5750 1568 6281 269 5985 10973 8518 9415 1028 4722 13275 634 12113 7104 7436 12787 1032 5936 3425 11526 10797 784 9208 15 11223 12849 4913 10635 3553 8852 11749 10619 3532 4080 9831 9219 6560 6049 6111 1304 11770 12585 13209 8589 11287 2887 10699 14307 4752 456 4073 1175 13156 4894 12756 3237 6279 10125 7074 2344 7533 7103 5226 4000 4425 12173 10056 5312 1599 7445 8696 12533 11509 14050 2483 12405 2876 5033 4512 4955 5627 5572 5099 10987 10665 404 3082 2075 1583 13454 5666 7228 524 13290 7634 418 9006 7368 4181 9447 3674 8171 9355 10211 9342 12572 3681 3322 3295 186 7491 7926 212 5241 5479 1654 8097 5078 423 4817 1357 12780 3664 11900 402 13108 299 7166 12008 5750 3041 5618 8357 1229 8884 3713 8791 13375 4390 6302 568 1009 4440 10003 1209 11978 11711 1803 9838 13537 11318 9750 12421 2388 3021 7880 7220 1062 6871

TABLE 1m (Rate 31/36) (n_(ldpc) = 64800) 8971 1759 4661 2344 8810 3677 5653 5575 7855 8916 1232 6045 3232 8535 7071 6764 5731 2016 8662 3813 223 4080 3502 3358 2640 7181 793 289 4907 6380 6437 261 7395 3264 6823 551 107 3672 245 2133 2328 2462 2349 1096 4755 5134 5661 5948 3017 7071 6140 2620 4479 5669 508 5209 2522 3677 7033 4553 4780 8149 6346 4190 5242 3118 8430 2284 8323 3944 7479 7765 7974 3145 4381 47 3257 584 8668 3622 7087 6946 4527 5274 6111 4151 1805 3370 3713 3710 186 758 1606 8866 2975 3305 6548 2039 2197 4021 661 7382 3627 628 8334 4880 2742 5139 1910 5450 6338 8246 8710 8382 2952 3468 4905 3623 6578 2519 8966 1781 4964 623 4641 7520 6371 6835 1853 8584 3351 7486 7368 1500 5916 5328 2390 7684 8660 4286 7833 8517 3696 8199 4143 538 3959 8390 3414 8353 5244 5698 1645 3804 2158 1979 10 8920 6848 434 4640 3443 4662 3311 8682 4678 5773 8736 4743 7365 213 3257 1449 7394 7035 356 7916 2503 7790 8719 7879 4639 4251 1160 542 8333 3163 713 304 1515 3019 5747 7901 581 857 7416 6967 4325 1224 8200 817 7526 3694 1563 5341 4464 1668 4154 2731 5150 3051 3027 4312 8372 8168 2438 6549 1669 2508 792 5112 6776 1508 8775 1199 2766 456 4827 7450 6774 4851 6529 3650 1777 4738 4717 6245 427 5897 956 7912 829 3876 5237 7972 6664 7929 8937 8392 7322 6575 7176 1446 4850 5066 8804 8899 8400 3469 6998 3642 3011 7923 4486 1765 6452 3059 5714 788 2207 3170 7267 1301 4997 4439 5972 2812 1780 6970 1589 7959 8278 6071 4534 3352 97 8471 2786 2155 2310 981 4507 7595 8390 1576 903 4985 906 4329 6038 3816 6655 3181 8643 462 6342 369 7927 5468 4640 5158 5099 8728 1162 1013 1668 4991 10 4023 7683 2169 5932 4904 1508 8599 81 7255 1696 4953 2574 3819 8670 4354 5201 3245 8547 2582 8283 5948 112 0 3555 8320 7361 3833 6990 2073 8147 3267 443 5558 422 4028 6204 3714 3204 1319 5834 385 2462 1221 7359 5931 8590 8507 6028 1036 6649 411 8848 2741 8385 2 734 5600 5141 6463 8874 5635 7438 4542 4355 8441 7926 3737 106 6421 5843 4827 1068 8169 4377 6957 13 3539 1226 175 8814 7140 3442 5985 8721 8564 6126 3850 8168 7291 8950 3881 1495 7555 8118 5993 6269 2364 6839 185 4721 8226 3508 5415 7558 6282 5985 8472 2791 4386 6780 6798 2965 6375 8983 3049 7644 5774 6057 8856 1119 6354 8565 6181 1611 8078 3236 6834 5834 2671 1352 3780 2609 3762 2341 1778 6913 523 2420 1779 6462 8692 4898 3367 3526 2137 1829 1013 953 6042 4363 347 7052 5170 5807 5302 2622 4624 8309 4278 3905 7431 3576 391 6 2284 6866 624 7584 7746 3739 5085 2171 7148 1787 5217 7011 3901 8124 6487 2318 1527 8208 889 7568 4516 1340 1403 7681 680 8128 3502 8037 5595 6254 6343 455 3114 8126 6908 1370 3185 1047 4035 8017 2815 7533 1663 2346 4345 238 3292 527 7323 8811 7598 2211 5857 949 554 7169 8797 1600 869 1269 3815 4457 4850 3857 3079 4500 4413 7547 2532 250 46 3357 7128 442 1828 1156 566 7441 603 6927 7801 2986 3767 1008 5843 4822 979 1910 262 7958 721 2898 3835 1141 3693 1448 4271 394 4379 4286 422 2275 2026 4383 4840 7098 8809 742 129 7220 550 7440 6138 4257 7627 3234 8724 7147 631 2669 680 3924 6213 3684 935 2781 3219 8705 4977 2276 6690 8586 4945 8664 7205 5893 7264 6887 1064 6249 3962 7938 4495

TABLE 1n (Rate 2/9) (n_(ldpc) = 16200) 1412 2138 8984 3438 2515 10585 11093 5801 2511 2287 10879 10470 10973 3691 11847 4141 479 7406 3228 8356 256 11769 2480 8892 9040 4517 2672 11159 7865 6415 2638 5399 7575 952 3128 12126 6408 60 10782 10254 11866 4473 10592 8736 3819 669 2091 5790 5040 6987 1353 2734 9859 3974 12568 5396 3717 6005 5830 9748 7221 8759 396 2259 11357 5702 7043 1281 6308 11899 7792 6476 3741 11099 6895 3224 1940 8224 8533 607 5065 9226 7677 389 7233 11605 7002 1302 10984 3435 9186 5964 7806 1613 11451 6020 5275 4965 6307 6942 1054 2451 5545 10447 6453 6583 6177 6284 11747 11323 2696 5058 3217 6755 1434 3691 8784 11507 1298 1233 7964 8103 6761 11865 1288 4258 7960 6753 4896 3722 3526 6795 4663 2198 9374 8700 9195 9272 7573 6956 3057 10801 574 9292 525 989 7701 3754 1110 330 3367 10472 6202 2627 1181 11223 3564 1628 8362 6419 7476 10074 1406 12509 9757 10380 9841 100 10177 8331 6788 8872 11167 2167 3646 2770 3111 8679 9590 9338 9119 8373 90 10418 12041 7718 3102 8551 6068 8424 10522 8595 6512 866 4591 3390 7496 172 1467 9023 9000 4113 9407 7168 29 11625 8584 8396 9683 1457 6097 9254 1850 12476 11664 11115 4278 11945 844 9302 7661 12225 1040 3671 5318 4875 3554 10478 10902 11739 3429 7114 5533 3709 689 2951 10126 10677 8709 9880 1112 681 6786 2945 8823 210 689 6648 509 2228 11109 10495 8746 8223 4337 6804 371 5245 7435 8110 6001 11003 5097 2116 3826 2054 5220 7231 3029 5134 8970 132 9603 1538 10743 262 11188 990 6782 3283

TABLE 1o (Rate 13/45) (n_(ldpc) = 16200) 7200 3499 6246 3905 247 2945 6706 2366 4892 5254 3370 7202 8203 6971 5728 4002 9544 5247 5176 5021 6732 8016 5317 9111 11144 7046 7808 8792 9779 11402 10050 7970 2047 6746 746 11319 4085 9903 3751 10712 6662 10504 7149 8084 7417 4334 9448 10678 9739 3412 2152 1114 6077 1021 10761 5073 3458 10115 4722 2581 8860 1515 1997 8926 471 2708 1449 158 4140 10611 10740 9693 3165 10132 4839 4204 10917 2320 6112 867 4929 9201 1707 10355 10887 7531 1123 8118 8896 5168 2011 110 9188 8375 9421 1693 1252 5132 10342 3726 2094 761 7397 10962 1848 4584 7139 1858 10499 3638 4924 1466 4191 2999 7778 11389 1071 2537 9265 5340 11498 4140 6795 3575 7332 10491 1502 3493 2380 3962 5169 2719 6028 10291 3440 7669 10253 8175 9134 2374 10199 2229 1055 5597 6655 7533 1518 11299 3033 1083 2464 10032 10910 3439 11511 3763 1424 9362 3170 10113 5492 11354 3160 10592 10897 37 334 8974 8540 9590 4255 5342 6469 11153 2925 3384 8958 7809 8108 2721 388 280 3829 8071 7567 10280 8151 22 8789 256 6937 5050 10795 1844 7999 1047 8549 4046 1696 893 8952 9610 10014 6772 485 9159 11346 10133 4447 10089 9419 7756 2637 6446 11400 9357 9302 2726 1559 7231 9930 9385 7889 2356 11066 14 1180 8283 458 5862 5540 3284 7878 9379 4637 11123 7791 8965 10476 2620 2593 4749 1747 4818 10173 596 9833 4518 5205 2808 592 228 10538 5907 164 2111 6334 1930 7625 11378 1531 3798 8978 4224 10183 8729 2755 10694 4801 2302 2649 1977 10031 3495 4789 1102 760 9858 700 3625 8633 3152 6230 9510 6123 2053 10767 50 1777 10548 6803 3935 1861 220 3117 211 7402 7164 5909 10691 4175 4997 7823 830 6156 5451 11467 1346 2838 5962 2858 10343 905 3219 1146 584 10896 5474 5315 3529 5378 4164 3155 9405 11386 10011 9288 7404 1200 8828 649 9557 9284 11419 7104 6268 918 3637 11395 5539 4612 4850 1965 8574 7497 8644 857 2038 10674 10465 886 10864 7119 353 9657 3090 7792 408 26 5892 4193 3663 10393 11181 5241 2721 10010 3240 7704 9370 8872 9280

TABLE 1p (Rate 11/20) (n_(ldpc) = 16200) 4692 1824 629 6885 466 5885 1190 3308 7241 3690 4845 4383 7107 5761 3200 4648 2401 6747 4908 1777 796 6724 1310 2462 3313 5669 6966 7054 6004 4230 1509 1194 4523 4356 1438 7261 5516 3549 4934 4308 7052 3603 6516 945 3511 617 5820 4168 5622 4545 1242 4382 1781 3490 4461 2464 6762 4082 2975 6166 894 1316 5228 5057 4644 5319 784 7037 3831 3570 853 1703 5064 1011 1642 6895 863 4176 1115 5811 4326 4263 2325 2685 223 6496 669 571 5057 1096 3594 7208 3140 3336 992 3516 4296 4492 5796 1875 3068 4970 6802 2652 214 6831 3611 2470 846 640 2983 2208 5295 5924 5242 5747 3017 1208 974 4819 2163 1631 1198 4570 2983 3664 2253 6131 4672 4698 3272 3537 4532 346 4936 5696 1275 6386 2124 7138 1179 4236 5891 3688 3376 6079 2437 4585 6404 1101 2289 378 6773 2800 2195 5013 3121 6579 5086 4192 3925 6844 4327 6329 6075 2738 6941 4088 4631 5613 2332 1432 5655 2516 5657 5383 3494 1235 3237 3282 449 1982 4339 6071 3262 5233 7004 390 2526 4128 3762 1284 4669 5897 6506 5840 2240 5046 1769 2539 6637 5000 4013 2325 1798 4680 6318 6746 5262 215 6980 2436 6086 1764 4227 4273 3163 2663 2406 2037 2549 649 4346 2391 420 3069 4930 6338 1834 6713 7013 1483 1918 2122 4147 1365 240 6277 6965 2436 2263 1334 2766 3525 5125 5808 4540 270 479 6244 2162 1409 7159 621 1439 4703 6526 6147 2701 7284 5510 558 3472 4520 7268 6903 4942 2301 4603 3451 512 3982 1219 30 2433 3797 469 4999 1845 6340 2327 1127 4663 6218 2112 4826 4851 1442 312 4788 5715 2449 2205 5056 1293 3985 1505 5768 5534 2604 6887 1831 1693 3557 5558 4425 3317 908 6236 5087 2257 3043 7159 3988 4837 4823 2208 908 6145 7232 1654 5099 5820 154 5058 3816 5710 5209 4080 5824 3820 7136 7066 6226 4999 4818 3081 1008 2378 3443 4210 525 3330 6183 1159 5073 5340 5786 3287 325 590 4048 4667 2821 4634 4645 2287 6592 580 4814 4375 4460 1799 160 2686 372 2129 5124 2066 1088 5047 995 226 5085 6263 2380 6679 3460 3011 3728 368 2642 365 3253 3801 2032 824 3243 4488 7088 6069 1002 1830 5718 3944 5213 7126 4207 5638 5780 1663 1081 1969 7238 1671 188 6826 499 5878 4110 393 2845 3816 3302 3755 2810 3055 5876 4890 3663 4288 2134 2926 2633 964 5454 2540 4811 2737 7149 2494 3042 7140 3546 376 4567 5871 4351 797 4245 7178 6811 6722 1351 5102 7241 6537 6828 1345 266 3094 2749 3658 5328 2573 1454 6444 5267 4847 1407 1305 6597 665 860 1934 6150 4115 3799 4362 4407 6956 6703 1355 2152 943 3688 6536 1737 1856 3374 6987 2896 3414 4897 1339 3530 6599 2011 6911 4907 4542 3723 4374 1444 3344 568 4887 4732 6402 1609 4422 2809 2306 570 3063 4645 2697 5994 505 5805 1353 74 6648 1738 725 4900 1614 5497 841 649 731 3474 4246 1530 6986 2023 4976 259 6173 987 5313 2276 3770 4029 5101 4900 3767 6863 3991 2090 6639 1708 6603 328 1674 1476 3494 1497 3083 5233 4103 6677 2522 6812 6404 25 1986 409 2739 1882 3534 1958 861 7072 1958 2364 5609

TABLE 1q (Rate 23/36) (n_(ldpc) = 16200) 4626 1140 3468 5725 2133 2303 473 1009 822 4351 2620 4725 4712 5060 4753 2897 5002 147 236 1234 4181 103 3305 947 2893 3155 3944 5064 1931 2538 3341 4027 4268 5630 671 2963 4446 1161 4388 5381 4986 5105 5817 4928 4420 3543 3452 5455 4711 3255 1654 2549 2963 1256 2235 1127 171 2482 1282 75 1645 2833 5326 2386 4508 4547 3789 1497 5124 2650 2370 4577 1421 962 2986 1788 4993 5240 1659 1071 980 4674 2477 5373 5719 1828 3904 5050 2516 58 4982 5550 5600 3411 1568 3674 2916 4767 5114 3143 4289 2589 1305 4489 1050 5696 1860 2030 4584 1514 4425 3025 5051 5435 5675 2726 81 5031 193 4032 3282 228 392 4389 2396 5698 5563 4218 1740 4605 714 5520 3616 5534 1115 2065 1267 128 2019 5820 791 4558 5700 4883 2655 2903 2269 4669 367 3392 3845 1937 581 928 713 4773 2637 1195 2941 3974 2614 2251 2311 3724 357 5847 1614 543 1039 4426 2821 3108 2323 224 4424 622 4731 2476 5740 1002 5065 4869 1384 50 5035 825 1302 2500 214 5711 4191 4268 5218 3679 1327 4629 921 1368 2672 429 4639 1916 4278 3126 3440 50 3976 5237 4865 2990 911 1768 4500 992 4704 5171 1737 4858 244 5647 4413 3838 930 1764 1832 4028 4958 4098 1522 1326 701 432 63 5603 3397 4963 3719 1757 545 3634 2417 51 476 3169 1744 2751 3068 2754 5788 435 502 3431 5141 217 5343 2096 1154 5301 5455 1306 5538 1821 3787 3714 805 967 4366 40 5228 624 3319 4013 4113 2110 1412 4137 2376 5135 3884 4890 512 5327 5807 2441 3652 5512 3623 1827 1019 1357 2629 2039 4047 4608 152 1129 634 4708 5165 4941 3432 1682 2583 437 4956 989 3149 2444 5476 5063 3147 93 2652 2694 3510 3484 5215 3576 5330 1214 1301 4752 2544 665 1669 3425 3851 917 1677 1696 4385 3184 5716 2684 416 1587 5466 5117 807 402 1819 684 2619 1271 5820 1818 1010 3901 2373 3739 4706 823 3718 3738 565 5476 4945 1396 4745 4776 2784 1079 918 677 3991 5626 3195 2401 1007 3257 1378 5770 2213 4972 2611 2515 4883 4015 4442 3965 5844 448 4852 2035 3579 1090 4495 2482 3385 2415 5603 3036 2307 2416 4994 4832 4212 380 38 2773 2057 1308 436 2291 924 3045 3575 3084 4507 4803 3768 1673 118 4804 3762 2931 4736 5619 1357 2531 3547 1153 343 2676 3784 1810 4515 2576 348 1551 2939 4088 834 5396 1260 3465 1734 803 907 2471 257 1523 1632 3775 2968 5100 166 4352 962 1869 5173 47 4415 5040 782 2449 1611 2239 4649 1664 4422 4211 4708 5777 5762 2579 4418 609 3241 5088 3031 4033 5306 3404 2633 3330 4899 3679 2287 584 5181 4162 3310 1783 2487 2229 334 5507 508 5296 5348 4143 1902 4200 3938 2790 5150 5834 4250 4392 5223 5221 1662 2779 170 2942 116 2334 134 4175 1970 1114 4668 2250 3336 393 1764 3709 5156 3925

TABLE 1r (Rate 25/36) (n_(ldpc) = 16200) 3717 2086 2490 983 835 4687 4347 4476 3404 1761 576 4145 578 368 2845 3005 909 364 3235 3961 4076 512 936 592 765 2964 746 1927 4924 2903 3317 3261 1270 4535 4082 4236 1298 2632 3931 2365 4093 4275 1695 2374 428 2881 2308 1623 277 3560 3583 2093 2563 3756 2174 186 101 1014 1629 496 1763 2714 3520 1193 243 2712 2503 1332 1039 3201 3305 4587 3408 433 267 4567 3310 3949 1938 280 3951 4404 4528 4292 2791 2944 1533 1437 274 1965 2557 4701 2488 858 3540 2134 342 4890 2891 1947 1353 2021 1422 388 3045 605 2847 4059 1204 3680 1505 2758 3764 1874 2296 4804 337 2581 1810 2235 3623 3387 484 262 177 3981 2578 3711 215 4569 3281 572 949 2395 1082 1689 2912 45 2900 4391 1219 3966 3939 1521 3156 557 2258 1247 4471 1347 349 1683 4762 2854 1469 1924 3164 1079 1270 4828 2363 2104 1792 22 3231 2775 2423 3177 2287 2571 2530 3480 374 4526 4713 4760 3606 1798 2371 2510 4392 2655 3731 635 1264 4808 586 1530 3539 4714 4507 3826 4767 4887 750 3153 2851 2381 3547 3114 4280 4442 4710 4773 3920 4356 2976 1155 1394 9 2545 879 4188 4150 69 1372 3483 1347 2676 698 2922 2547 4926 391 2998 2896 3684 92 470 884 3186 3751 999 2259 575 4155 2053 337 353 3449 65 2292 726 4700 4012 3049 3508 1443 2438 132 3100 4427 2810 2208 3640 1993 4029 3104 3956 3298 1291 9 2926 39 1053 3365 1223 344 4142 3983 1564 3438 271 3187 2143 1179 1422 4808 4103 4814 3081 1550 2594 679 3404 344 1749 1011 449 4522 3490 2052 757 2508 2035 3087 2578 2330 3765 883 3322 3949 2156 1486 1230 4166 4106 3157 3789 1804 4237 4644 4832 538 2571 1231 83 3391 968 620 3841 4072 430 3715 3034 3594 52 1688 1107 2451 2790 4493 3131 4635 3197 714 231 4226 2122 961 1094 1118 1540 1550 1283 940 3985 679 914 952 983 3030 868 353 562 4129 3178 1719 931 3248 659 378 122 3064 1132 446 86 2986 399 3004 1700 217 4511 4712 3852 3189 4715 3500 4823 2186 2221 1472 4220 4206 376 1077 602 1281 4257 1385 4528 1354 2730 2701 738 2008 3989 3825 302 664 995 3473 4540 2668 1663 2271 2465 2334 3551 4028 799 3523 3877 3738 3999 2832 2187 4404 597 1291 2382 1411 3478 831 1080 1720 460 2630 548 1359 3736 943 1813 396 3447 1040 55 1438 3007 2305 99 4399 2097 672 127 1972 2670 3843 2060 4500 2824 1088 3904 1646 3473 920 1832 3307 1885 891 370 3530 3988 1530 1622 3751 2515 4840 4819 532 2263 4213 1894 3241 2172 1720 1298 3976 780 3088 1683 4340 3075 2980 316 2455 1701 1106 2560 2811 151 2481 3157 1670 552 1329 3876 3378 1137 4060 37 1087 4074 2256 787 1840 4448 2800 3711 744 3710 4914 58 2171 2569 2173 1552 3975 4486 1025 2337 3313 1972 3531 1465 1836 3509 452 2216 2993 3440 3921 3059 1143 2621 1196 3864 2468 3362 4556 3153 3242 825 53 4058 1046 3814 550 169 1123 533 2467 4843 1523 64 3493 3882 2708 1378 647 3834 4460 1989 3734 1011 4453 847 3376 3723 1065 1964 4882 2409 3797 651 3980 4069 4291 1004 4321 4214 2961 4944 2277 1984 4617 3331 1022 1204 1943 992 1609 2287 438 2425 1553 1922 2389 2119 3996 574 2810 3813 2944 4546

TABLE 1s (Rate 13/18) (n_(ldpc) = 16200) 2192 1265 868 3272 569 2864 2608 666 2275 105 2140 2364 299 3944 3601 3720 588 2437 3256 823 1834 2010 1287 96 3400 491 1853 892 3359 202 1517 4347 1598 3895 686 2526 434 28 18 1702 582 3070 1123 1334 3288 1717 1954 3993 2483 2045 35 441 713 2921 3908 2027 3853 2180 1670 1473 2087 2054 3055 2764 1440 2563 1192 2573 3322 4436 4435 1417 1879 1661 1555 2334 1473 2207 4190 172 2640 4281 2091 3492 2509 339 3293 105 3822 445 1170 1350 1994 2696 3867 4048 3816 845 3661 1841 3485 3973 522 4150 3497 1752 284 387 2392 2776 1116 3378 1486 1249 4354 1539 2944 93 1914 1602 2903 3143 3574 179 1280 149 2558 2450 1120 4418 1355 3730 570 4107 4422 4406 1492 4313 4415 2767 1547 4305 1658 1693 289 654 3281 3159 1076 798 3801 1160 462 1419 3371 924 3575 2427 232 4083 1375 29 2364 2909 2843 3668 432 2488 183 4498 752 84 663 3968 1901 2766 2056 1497 1087 3498 4169 933 2713 3947 2418 1075 685 99 1010 1144 851 4150 2141 48 2111 4190 3875 1906 2883 794 2357 662 2065 971 3174 3127 3428 2481 3696 1816 3712 1751 3777 3381 3107 486 2649 3947 4335 1971 401 1539 3940 3111 3506 2088 1113 91 2769 1509 888 1769 960 2853 2485 433 2329 4489 3907 4394 2800 2226 3816 1352 4429 2481 1632 2459 3107 317 2662 1465 624 2078 980 2296 714 3758 838 4479 3212 3165 160 2037 3445 4296 626 2678 254 2577 1510 4195 2262 4158 3656 4026 2203 3427 199 3904 361 471 3274 930 1932 4386 2789 1078 475 2319 1903 1961 3515 1121 1374 3930 3231 1782 36 3846 3586 4292 1220 3459 1843 4285 2959 3197 737 1475 2767 3284 2071 4248 1601 1692 3935 783 1613 4030 3217 3574 4439 2783 1366 1849 1685 3923 2519 2224 559 1215 663 2654 2213 1720 2642 4206 253 3869 2100 1908 738 1269 2067 1314 3511 4104 251 3250 1429 1997 557 2622 2684 4196 3297 4162 1270 3774 4377 1188 1614 178 910 3254 1707 4401 684 1006 1808 933 160 73 4031 2416 131 3480 3545 661 3762 1057 3179 999 1545 4068 352 4394 2240 3846 794 4489 505 1749 781 1561 3982 1960 2888 3246 2468 1277 3752 2091 964 4143 1702 2300 2330 505 3566 4190 1808 2698 2173 4106 1144 1822 4295 462 3187 793 175 3276 415 3371 1725 4436 1079 3227 4428 2968 1471 1103 926 3455 2826 2803 2122 1078 3315 640 387 182 3191 1486 4489 4282 2241 3748 589 4076 2164 567 677 490 3887 2508 1393 764 577 3086 2108 2784 1762 1281 601 460 3810 429 4396 3043 125 1429 1028 3836 2717 3938 279 2184 4248 466 1653 3827 2192 889 1522 2435 3058 3583 1619 2134 3857 3089 814 301 4380 320 1628 3244 3490 1838 2136 632 4093 3101 1319 3738 1154 1331 1965 2897 3650 4390 3487 1768 2578 1487 3465 665 4350 1083 2935 2974 1354 2782 1726 2041 292 2848 4068 118 2581 3525 1283 691 2946 2957 21 1450 3182 1709 2373 1320 2098 3911 1752 2805 2426 2356 2885 3662 175 1446 3774 709 2773 1345 1704 963 912 3353 4220 16 599 463 3105 3157 41 4244 3244 72 410 455 2849 1847 1197 174 4056 2745 1903 1271 171 3511 3072 395 4469 892 2567 2413 1956 2430 1349 4352 2561 1030 2 1809 3416 3973

TABLE 1t (Rate 19/36) (n_(ldpc) = 16200) 1282 5463 2055 1492 6457 6767 3505 1482 1439 6574 60 2796 3840 1600 3301 4638 7064 6019 1981 620 1585 6357 6215 2923 5347 1877 1546 5034 3058 1839 4485 7647 5859 1883 424 2650 5559 1779 574 4934 42 765 2647 3586 4426 4731 1714 2322 3561 5920 4388 5319 217 1430 6897 3410 5416 6595 7285 130 2164 141 7069 6618 2274 2510 5625 1070 6638 6664 3156 6564 7425 3088 3992 7531 1469 2669 763 7347 3322 5053 4922 5014 3202 627 991 1165 3897 6116 7469 1315 4928 1483 1555 2699 2262 2815 2251 1615 6892 6023 1882 4243 3593 3012 3144 1914 6929 3722 3145 3032 3864 4084 1371 657 4019 4635 5898 1009 5077 1866 4950 3746 2553 5393 5486 5144 207 1921 5618 7390 7155 464 494 5977 144 4421 2752 5922 1530 481 3468 321 5883 199 3099 2896 3951 4141 6906 3162 3695 3899 2980 2973 4003 3742 3750 7130 6877 839 2928 2543 5169 5148 2056 41 2080 2599 2722 2416 3253 3228 5591 6946 2811 222 1503 1297 4977 2500 5383 1994 5541 298 3762 2433 1419 5906 237 494 6274 3527 2583 5711 4866 4231 3453 365 2829 5364 6965 3810 4376 885 826 4987 5634 3645 5630 3278 6526 7357 7587 5871 163 4849 1441 4931 5085 1060 6817 906 3155 7471 7393 424 7341 4823 6053 991 7013 7624 2416 4062 3427 6316 7269 947 6047 326 2745 402 6140 4286 2383 6100 6343 5747 1647 5145 2211 3555 4423 5854 3333 6933 3469 594 1374 1127 5235 3114 3804 2214 6081 757 124 2885 2678 3407 2159 2007 5604 2084 2605 4435 3893 1119 5601 4518 1252 5314 7546 5244 2570 1794 6227 4193 3178 2890 4720 5205 2902 3488 5583 3873 5066 967 1809 3834 2284 2649 3798 1431 7547 4545 7423 3136 1389 3355 1919 879 7098 7396 3276 1101 5577 6466 243 6253 7271 1017 3678 2005 2227 1249 6514 7267 2076 4668 4521 7170 2955 1293 741 4839 5039 2957 2363 5604 3846 1306 753 604 2017 2464 6487 2840 7272 6063 7068 42 113 1406 1468 2423 181 1942 5402 4675 1733 1596 5823 3523 1958 994 3816 5818 1244 4898 6341 7032 5426 1432 326 5651 3397 5072 2443 2461 4560 2472 3758 3050 2297 5776 6071 1640 3546 4878 5368 2438 1294 6553 5618 5324 5595 4194 3383 5457 2707 1713 932 3538 1262 5996 6778 1405 6942 3091 4905 6802 3748 5126 4580 243 3252 5151 7106 3489 5405 5216 2129 5194 4300 5641 1046 6143 3885 2161 864 791 6392 1100 5526 2661 4948 6150 925 3893 3038 4340 7175 5967 7475 3905 7246 2988 5017 7236 2542 4959 4592 2020 4870 6237 5239 515 2569 6152 7596 1508 600 2636 5149 3379 969 5263 7120 6849 3730 1755 19 134 908 1085 820 2457 4609 1863 683 3633 1875 4627 122 877 2706 27 6193 2665 7028 1598 3375 6927 5785 1347 5121 3665 1560 2584 4965 1456 3102 5026 914 7416 6150 4030

TABLE 1u (Rate 26/45) (n_(ldpc) = 16200) 3342 3896 286 2799 122 225 3074 527 4736 3291 6197 2055 782 2969 1015 3879 2215 2097 5913 3800 1450 4137 790 1711 4937 623 6654 764 5116 4633 2954 865 2768 1454 1505 4122 723 2893 3735 6674 686 6731 1152 1737 233 2045 6701 3020 2515 1392 1713 4962 3036 5227 4443 4815 5354 2875 4808 5610 912 2730 986 2966 6108 2589 2092 1356 6550 1153 1339 3811 6686 1612 4420 2154 1200 1202 46 5462 3392 2073 2641 2443 178 5965 451 3212 2712 2321 5295 3041 5632 4645 1917 1539 5801 4287 4140 3458 4908 1417 4610 6057 2469 6087 2938 2996 4452 3322 5275 5166 5231 556 2041 2394 5471 6178 3006 5507 6712 5367 70 3959 1974 4989 155 2620 119 3604 1833 3274 3612 4535 3651 1817 1942 2366 1835 1467 3842 4887 1502 5090 525 189 1386 3053 4727 5460 3135 3389 527 2521 2140 4513 5491 4293 5095 689 67 2882 4257 349 3269 3282 4172 3853 5318 2806 4695 1735 4460 6257 1798 4657 2292 2320 2999 4233 5016 3609 278 4528 6127 466 2331 926 6766 1132 3582 4533 678 1157 5108 3778 1832 4139 5790 5090 2141 6398 5184 4222 2042 6207 5466 3168 1871 1264 5917 6314 3659 2310 1742 5445 4140 6000 5150 1155 143 3400 2639 5768 2780 4987 1835 4146 6628 5734 4237 6148 4325 6696 2274 4915 3676 6728 5428 2176 5486 2627 4986 1929 68 742 3802 6509 1799 3406 3884 5524 2206 2757 896 6338 6365 6313 3387 1768 1345 2571 3380 5248 5100 5081 600 5783 4252 5992 5409 2738 1274 806 5715 3236 5172 1209 4525 5625 2842 6628 2395 5353 6118 4629 2380 3807 6094 3715 6294 4945 4441 1998 2041 5513 3323 4863 5342 1204 5258 5620 1792 4297 2964 3532 3457 2602 4708 960 2403 4037 3741 5923 5594 3939 4940 6339 2330 6292 4804 3631 6783 1879 2106 550 5910 2807 6503 4535 5812 4836 2742 35 5825 787 2097 3210 1116 2407 3792 903 5096 6116 4529 3796 2160 6276 3078 3567 3214 5177 3631 1224 285 4740 4420 1573 6196 5175 5035 3928 2295 4470 1737 5276 1239 6625 2942 4132 2375 1607 3463 5951 1281 82 1012 3477 1806 4920 1925 5574 5913 379 983 5057 6791 2752 1852 1132 3663 2878 2753 3655 1523 3624 6439 3113 6090 4755 4901 6589 2815 1145 2363 3350 5683 1992 1301 2028 1707 6200 5759 6062 6802 6165 4302 929 1545 6677 4104 109 3925 185 789 3408 6198 5102 459 2275 4508 5677 6836 4901 2072 6137 2648 2512 4391 5684 5406 2791 4801 2737 1955 3948 1201 3711 4746 1808 3060 3372 3310 555 188 133 3764 3949 2517 173 5046 3770 6557 4844 1249 2441 2706 5831 3683 2025 1935 2155 5753 3247 4264 5927 929 6555 4057 5649 1061 1378 2182 3482 1173 4857 2834 3977 4818 1849 516 3296 6744 4295 1249 2379 5218 386 1945 1673 3218 2083 4442 549 1634 2488 5987 1064 6001 2585 1821 5471 1009 6675 2846 4145 3467 3817 1096 6516 2071 2266 616 6128 6668 6004 5264 6787 5425 2438 2641 5574 6634 3556 780 5997 2387 4854 911 2855 4426 5797 6375 2520 6703 4228 6706 154 3603 3039 900 6570 6006 1980 2520 4509 863 1048 5120 6272 2444 2648 3009 39 455 2371 3763 3299 1389 1369 1042 5140 1690 6798 5400 6540 121 3308 4059 3300 4207 713 2486 4294 5370 4587 4522 3069 4534 5502 1111 3750 6526 750 5578 2265 1483 5754 1394 2879 4317 4966 1429 1891 4930 4675 745 5615

TABLE 1v (Rate 28/45) (n_(ldpc) = 16200) 2216 5353 6062 4045 2714 439 5415 1685 2362 1169 4069 4589 1144 2027 368 1630 3581 3086 1765 399 916 2662 4830 39 4003 2405 4737 4538 3125 2372 3690 4433 4812 3027 3019 5751 2219 883 2853 329 5644 2032 687 631 5202 3622 1372 4048 1947 4836 4630 5995 2000 933 917 1916 3151 4394 500 2889 2079 533 1817 6090 4829 5007 462 1363 4535 2260 2567 3541 3963 639 2123 3398 4196 1880 4933 3898 5325 3699 195 2509 6098 5401 2490 1934 4540 2715 2247 70 2526 5625 5855 3484 5293 3423 4853 2217 3597 5507 3633 5580 978 3900 479 5950 685 5778 186 1898 160 5418 197 2148 3231 3009 1214 2492 4687 3664 3441 4152 4621 3875 5621 2310 3414 3746 1618 1397 429 446 1402 5545 6016 218 255 4024 647 4204 3631 5470 173 871 5457 3157 619 2109 4665 5695 1996 277 5885 3967 5368 2835 5308 1675 4930 633 3581 1814 3494 5422 5575 4330 1686 479 1866 2365 2688 4753 698 5772 5857 2196 895 1433 4470 3550 740 431 418 2955 45 5727 5395 2902 2394 2986 5308 4595 535 1194 1834 632 1280 501 5445 5943 21 6059 5488 5287 2276 985 1833 220 1823 4772 476 5431 1362 9 1039 5597 2429 638 1928 109 5380 3549 2870 2193 5084 1568 74 1281 5299 5525 4099 5879 1684 5362 3542 1402 5044 3685 2767 3204 99 4201 1599 3598 5362 5780 3135 2119 54 986 1831 1858 1152 123 3250 936 4422 1254 1437 1101 615 1899 86 239 3572 3224 5850 3362 4258 1598 2433 1343 4786 40 4646 2069 1058 1453 877 418 1551 3509 4693 1851 1040 3104 388 4688 2306 5765 5836 1650 1988 398 2185 6068 4904 3583 4510 6071 2846 2144 5664 44 3840 2468 2632 5795 2988 3769 515 164 4562 3784 144 6001 5591 6032 1728 3749 3265 2300 4986 3085 1052 5096 2078 4664 1088 1119 6053 5544 11 3944 5079 3955 3576 1087 3175 457 492 5024 4484 174 572 2038 1979 4792 42 2230 587 3850 2663 2563 5654 1013 3026 465 4617 173 4316 1702 2914 5227 965 3472 5892 2667 256 5291 820 2850 1079 1882 4774 5825 5021 178 1791 3300 5047 6031 2350 5957 5190 4900 5174 1441 964 4274 599 1710 5031 2827 5490 3188 4508 628 5088 2262 3594 2622 954 499 76 4082 2678 4959 1174 5858 4221 2400 1477 3539 2175 2334 550 3994 639 5229 1628 4748 4845 157 1272 4726 1588 4984 3113 3011 5302 4257 4843 5548 1230 2197 2376 3119 3906 3481 475 2111 5481 5658 2372 5009 1651 12 2607 5285 5932 2683 1601 463 3431 5828 3783 4119 2358 3276 1966 1515 5809 1550 5938 3060 171 1727 2096 1254 5366 3267 1232 1867 4901 620 592 4316 5369 841 5451 1322 3247 2038 3029 823 4017 2171 408 788 4184 5128 2568 4318 5144 5968 5917 2086 5748 4216 322 5021 5857 1437 2016 2406 3114 1467 2221 3485 2093 2355 5344 3836 2942 3611 595 1241 3973 1357 1795 1685 5201 3401 79 1248 29 2269 2462 3871 4429 501 4446 4931 3977 4761 1207 3693 1461 4852 443 2989

TABLE 1w (Rate 31/36) (n_(ldpc) = 16200) 1271 1259 112 172 1770 1792 355 58 2103 1704 151 1728 542 1193 1157 1387 388 576 252 159 325 2049 1249 242 682 894 1040 1879 1088 233 597 1360 1189 761 1734 353 1039 817 1202 481 1401 855 1310 2033 1358 192 205 1906 860 1749 1216 1195 1550 484 1444 2004 589 1048 1927 883 2115 1203 705 1163 1482 531 2043 1375 504 682 1896 1312 984 845 928 1692 1139 2073 543 1326 219 970 1550 166 79 2110 1152 253 1651 1032 2079 493 764 266 848 1522 469 31 945 1553 564 1144 712 1499 1870 1747 688 1450 1821 58 2060 1607 1502 946 240 1559 668 1214 2213 1426 294 2033 1878 115 986 1285 609 572 257 2245 1605 2006 2152 685 1059 314 737 2055 467 1593 940 1432 1979 2140 1056 562 564 1749 1022 1835 626 1892 2155 266 232 788 222 1608 2062 1723 1480 1439 666 1715 76 325 354 1846 1328 1768 623 361 1766 1660 1351 2052 1977 1504 1224 157 1645 1512 298 1201 50 1606 1917 1846 619 2045 90 1503 1729 911 1252 497 1984 1917 798 1638 1309 1658 1436 1565 1260 1019 1568 1106 371 1361 1316 2074 2175 2146 1618 755 148 1783 1263 2231 918 2061 1546 1441 1356 927 1574 1021 1888 1737 1386 38 1665 1125 1069 744 1512 1136 336 1995 916 430 1673 1022 1799 2175 1391 472 273 1724 410 2180 2169 1411 2238 398 2105 812 1516 162 178 193 1116 1510 1261 1711 1619 1045 1912 451 415 1258 1141 1477 1001 377 1807 543 1352 438 1868 1658 929 2145 176 2042 1934 250 24 1874 825 1230 1170 2075 806 846 2082 2190 134 1471 479 2167 669 1857 590 1131 2078 73 1484 1108 2004 647 306 246 1492 1838 799 914 310 1489 722 1978 39 72 1748 1695 931 666 1559 1192 275 365 1229 1142 1738 1035 1955 1433 1573 1640 1152 1924 83 873 702 1020 1837 1776 2036 1782 441 1755 1498 1210 1513 1070 2193 296 313 300 2187 511 2243 1099 824 1456 1396 258 2243 607 287 1021 1782 1027 1611 1265 316 1153 704 814 1679 978 2192 709 1144 1253 856 64 1989 1251 1880 1434 172 944 1447 1200 776 1010 1844 747 655 582 1313 1664 2197 1385 2168 804 733 1711 981 273 367 161 1003 489 1422 1055 1710 1864 1729 1869 2240 891 567 649 475 952 1503 129 594 200 1215 1906 40 1952 1778 458 52 180 1098 1682 1757 2022 1487 1320 1148 1562 2006 2101 546 783 1711 1366 1141 85 1184 1376 268 1045 720 263 701 1844 1742 938 1909 2171 1093 74 421 1912 1675 309 974 1112 243 1691 139 2151 1557 2208 2057 2196 2135 1657 1026 852 1879 1397 381 2248 968 67 1315 1126 1909 258 955 1342 1238 1010 1499 511 1717 658 1841 831 1993 687 1484 631 2186 1496 625 1438 945 1210 675 1534 1394 1991 1771 1820 550 780 1537 61 1189 278 1672 2149 972 1289 1838 1330 819 348 2220 399 1644 1748 353 890 1477 904 1690 802 203 1529 1338 616 380 1246 806 1383 1237 1580 1651 1369 828 1964 1950 862 840 1356 2087 1674 1477 1996 1506 885 2093 179 282 189 42 992 1516 2005 576 225 470 1543 1320 402 2021 1020 694 2134 165 1499 1474 268 1082 1063 561 242 1111 554 1653 1416 401 19 1753 2064 1052 1447 2035 890 1260 963 1975 1536 1129 1158 984 373 1707 1697 623 1184 8 97
 648.


13. The apparatus of claim 12, wherein the LDPC code is of a structure that facilitates use of a plurality of parallel engines for decoding the coded signal.
 14. The apparatus of claim 12, wherein n_(ldpc)=64800 or n_(ldpc)=16200, and wherein m=360 for n_(ldpc)=64800, and m=90 for n_(ldpc)=16200.
 15. The apparatus of claim 12, wherein the apparatus is caused to further perform the following: modulating the coded LDPC frames according to according to one of the following modulation types: BPSK (Binary Phase Shift Keying), π/2 BPSK, OQPSK (Offset Quadrature Phase Shift Keying), QPSK (Quadrature Phase Shift Keying), 8-PSK (Phase Shift Keying), 16-APSK (Amplitude Phase Shift Keying), 32-APSK, 64-APSK and 256-APSK.
 16. The apparatus of claim 12, wherein the source data sequence is segmented into a series of baseband frames, and wherein the apparatus is caused to further perform the following: encoding each baseband frame based on a t-error Bose Chaudhuri Hocquenghem (BCH) code, wherein the BCH encoding comprises an outer coding and the LDPC encoding comprises an inner coding.
 17. The apparatus of claim 16, wherein the apparatus is caused to further perform the following: interleaving each coded LDPC frame using a block interleaver, wherein the coded bits are written into an interleaver array on a column-by-column basis and read out on a row-by-row basis, and the output of the interleaving comprises coded FEC frames.
 18. The apparatus of claim 17, wherein the interleaver array comprises a number of rows and a number of columns, and the coded bits are read out of each row in a predetermined order, and wherein: the number of columns in the interleaver array is based on a selected modulation scheme as specified in the following table: # of Interleaver Modulation Array Scheme Columns 8PSK  3 16APSK 4 32APSK 5 64APSK 6 256APSK   8;

and the order in which the coded bits are read out of each row of the interleaver array is based on the selected modulation scheme and a selected code rate as specified in the following table (where the numbers reflecting the bit interleaver patterns chronologically signify a respective column of the row being read out, with “0” signifying the leftmost column): Modulation: Bit Interleaver Modulation: Bit Interleaver Code Rate Pattern Code Rate Pattern 8PSK: 23/36 0-1-2 32APSK: 7/9 1-0-2-3-4 8PSK: 25/36 1-0-2 64APSK: 13/18 4-1-2-5-0-3 8PSK: 13/18 1-0-2 64APSK: 3/4 2-3-5-0-4-1 16APSK: 19/36 0-3-1-2 64APSK: 7/9 2-0-1-5-4-3 16APSK: 11/20 2-1-3-0 64APSK: 4/5 1-2-4-0-5-3 16APSK: 26/45 3-2-0-1 64APSK: 5/6 4-2-1-0-5-3 16APSK: 3/5 3-2-1-0 64APSK: 31/36 2-3-4-0-5-1 16APSK: 28/45 3-0-1-2 256APSK: 2/3 1-3-2-4-7-6-5-0 16APSK: 23/36 3-0-2-1 256APSK: 25/36 4-2-3-5-1-0-6-7 16APSK: 25/36 2-3-1-0 256APSK: 13/18 4-5-3-2-1-0-7-6 16APSK: 13/18 3-0-2-1 256APSK: 3/4 5-1-2-4-3-6-0-7 16APSK: 7/9 0-3-2-1 256APSK: 7/9 2-1-3-5-4-0-6-7 32APSK: 2/3 2-1-4-3-0 256APSK: 4/5 1-3-4-2-7-0-5-6 16APSK: 31/36 1-0-3-2 256APSK: 5/6 3-5-6-1-2-4-0-7 32APSK: 13/18 3-0-2-1-4 256APSK: 31/36 3-4-1-2-6-0-7-5


19. The apparatus of claim 18, wherein the apparatus is caused to further perform the following: modulating the coded FEC frames according to the selected modulation scheme, wherein the selected modulation scheme comprises one of the following modulation types: BPSK (Binary Phase Shift Keying), π/2 BPSK, OQPSK (Offset Quadrature Phase Shift Keying), QPSK (Quadrature Phase Shift Keying), 8-PSK (Phase Shift Keying), 16-APSK (Amplitude Phase Shift Keying), 32-APSK, 64-APSK and 256-APSK; wherein, in the case of BPSK, π/2 BPSK or QPSK, the coded FEC frames are not interleaved.
 20. The apparatus of claim 19, wherein the selected modulation scheme is a 256-APSK modulation based on a signal constellation of a 32+32+64+64+64 ring format, having bit labeling and [x, y] bit coordinate positions as follows (where ε_(s) represents average energy per symbol, 32*R1²+32*R2²+64*R3²+64*R4²+64*R5²=256, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring, R3 represents the radius of the next outer ring, R4 represents the radius of the next outer ring, and R5 represents the radius of the outer-most ring): Bit Label [x, y] Coordinates 00000000 [R2 * {square root over (ε_(s))} * cos(π/32.0), R2 * {square root over (ε_(s))} * sin(π/32.0)] 00000001 [R1 * {square root over (ε_(s))} * cos(π/32.0), R1 * {square root over (ε_(s))} * sin(π/32.0)] 00000010 [R2 * {square root over (ε_(s))} * cos(3 * π/32.0), R2 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000011 [R1 * {square root over (ε_(s))} * cos(3 * π/32.0), R1 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000100 [R2 * {square root over (ε_(s))} * cos(7 * π/32.0), R2 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000101 [R1 * {square root over (ε_(s))} * cos(7 * π/32.0), R1 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000110 [R2 * {square root over (ε_(s))} * cos(5 * π/32.0), R2 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00000111 [R1 * {square root over (ε_(s))} * cos(5 * π/32.0), R1 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00001000 [R2 * {square root over (ε_(s))} * cos(15 * π/32.0), R2 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001001 [R1 * {square root over (ε_(s))} * cos(15 * π/32.0), R1 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001010 [R2 * {square root over (ε_(s))} * cos(13 * π/32.0), R2 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001011 [R1 * {square root over (ε_(s))} * cos(13 * π/32.0), R1 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001100 [R2 * {square root over (ε_(s))} * cos(9 * π/32.0), R2 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001101 [R1 * {square root over (ε_(s))} * cos(9 * π/32.0), R1 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001110 [R2 * {square root over (ε_(s))} * cos(11 * π/32.0), R2 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00001111 [R1 * {square root over (ε_(s))} * cos(11 * π/32.0), R1 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00010000 [R3 * {square root over (ε_(s))} * cos(π/64.0), R3 * {square root over (ε_(s))} * sin(π/64.0)] 00010001 [R3 * {square root over (ε_(s))} * cos(3 * π/64.0), R3 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00010010 [R3 * {square root over (ε_(s))} * cos(7 * π/64.0), R3 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00010011 [R3 * {square root over (ε_(s))} * cos(5 * π/64.0), R3 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00010100 [R3 * {square root over (ε_(s))} * cos(15 * π/64.0), R3 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00010101 [R3 * {square root over (ε_(s))} * cos(13 * π/64.0), R3 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00010110 [R3 * {square root over (ε_(s))} * cos(9 * π/64.0), R3 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00010111 [R3 * {square root over (ε_(s))} * cos(11 * π/64.0), R3 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00011000 [R3 * {square root over (ε_(s))} * cos(31 * π/64.0), R3 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00011001 [R3 * {square root over (ε_(s))} * cos(29 * π/64.0), R3 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00011010 [R3 * {square root over (ε_(s))} * cos(25 * π/64.0), R3 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00011011 [R3 * {square root over (ε_(s))} * cos(27 * π/64.0), R3 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00011100 [R3 * {square root over (ε_(s))} * cos(17 * π/64.0), R3 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00011101 [R3 * {square root over (ε_(s))} * cos(19 * π/64.0), R3 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00011110 [R3 * {square root over (ε_(s))} * cos(23 * π/64.0), R3 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00011111 [R3 * {square root over (ε_(s))} * cos(21 * π/64.0), R3 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00100000 [R5 * {square root over (ε_(s))} * cos(π/64.0), R5 * {square root over (ε_(s))} * sin(π/64.0)] 00100001 [R5 * {square root over (ε_(s))} * cos(3 * π/64.0), R5 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00100010 [R5 * {square root over (ε_(s))} * cos(7 * π/64.0), R5 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00100011 [R5 * {square root over (ε_(s))} * cos(5 * π/64.0), R5 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00100100 [R5 * {square root over (ε_(s))} * cos(15 * π/64.0), R5 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00100101 [R5 * {square root over (ε_(s))} * cos(13 * π/64.0), R5 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00100110 [R5 * {square root over (ε_(s))} * cos(9 * π/64.0), R5 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00100111 [R5 * {square root over (ε_(s))} * cos(11 * π/64.0), R5 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00101000 [R5 * {square root over (ε_(s))} * cos(31 * π/64.0), R5 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00101001 [R5 * {square root over (ε_(s))} * cos(29 * π/64.0), R5 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00101010 [R5 * {square root over (ε_(s))} * cos(25 * π/64.0), R5 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00101011 [R5 * {square root over (ε_(s))} * cos(27 * π/64.0), R5 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00101100 [R5 * {square root over (ε_(s))} * cos(17 * π/64.0), R5 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00101101 [R5 * {square root over (ε_(s))} * cos(19 * π/64.0), R5 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00101110 [R5 * {square root over (ε_(s))} * cos(23 * π/64.0), R5 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00101111 [R5 * {square root over (ε_(s))} * cos(21 * π/64.0), R5 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00110000 [R4 * {square root over (ε_(s))} * cos(π/64.0), R4 * {square root over (ε_(s))} * sin(π/64.0)] 00110001 [R4 * {square root over (ε_(s))} * cos(3 * π/64.0), R4 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00110010 [R4 * {square root over (ε_(s))} * cos(7 * π/64.0), R4 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00110011 [R4 * {square root over (ε_(s))} * cos(5 * π/64.0), R4 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00110100 [R4 * {square root over (ε_(s))} * cos(15 * π/64.0), R4 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00110101 [R4 * {square root over (ε_(s))} * cos(13 * π/64.0), R4 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00110110 [R4 * {square root over (ε_(s))} * cos(9 * π/64.0), R4 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00110111 [R4 * {square root over (ε_(s))} * cos(11 * π/64.0), R4 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00111000 [R4 * {square root over (ε_(s))} * cos(31 * π/64.0), R4 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00111001 [R4 * {square root over (ε_(s))} * cos(29 * π/64.0), R4 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00111010 [R4 * {square root over (ε_(s))} * cos(25 * π/64.0), R4 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00111011 [R4 * {square root over (ε_(s))} * cos(27 * π/64.0), R4 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00111100 [R4 * {square root over (ε_(s))} * cos(17 * π/64.0), R4 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00111101 [R4 * {square root over (ε_(s))} * cos(19 * π/64.0), R4 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00111110 [R4 * {square root over (ε_(s))} * cos(23 * π/64.0), R4 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00111111 [R4 * {square root over (ε_(s))} * cos(21 * π/64.0), R4 * {square root over (ε_(s))} * sin(21 * π/64.0)] 01000000 [R2 * {square root over (ε_(s))} * cos(31 * π/32.0), R2 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000001 [R1 * {square root over (ε_(s))} * cos(31 * π/32.0), R1 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000010 [R2 * {square root over (ε_(s))} * cos(29 * π/32.0), R2 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000011 [R1 * {square root over (ε_(s))} * cos(29 * π/32.0), R1 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000100 [R2 * {square root over (ε_(s))} * cos(25 * π/32.0), R2 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000101 [R1 * {square root over (ε_(s))} * cos(25 * π/32.0), R1 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000110 [R2 * {square root over (ε_(s))} * cos(27 * π/32.0), R2 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01000111 [R1 * {square root over (ε_(s))} * cos(27 * π/32.0), R1 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01001000 [R2 * {square root over (ε_(s))} * cos(17 * π/32.0), R2 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001001 [R1 * {square root over (ε_(s))} * cos(17 * π/32.0), R1 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001010 [R2 * {square root over (ε_(s))} * cos(19 * π/32.0), R2 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001011 [R1 * {square root over (ε_(s))} * cos(19 * π/32.0), R1 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001100 [R2 * {square root over (ε_(s))} * cos(23 * π/32.0), R2 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001101 [R1 * {square root over (ε_(s))} * cos(23 * π/32.0), R1 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001110 [R2 * {square root over (ε_(s))} * cos(21 * π/32.0), R2 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01001111 [R1 * {square root over (ε_(s))} * cos(21 * π/32.0), R1 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01010000 [R3 * {square root over (ε_(s))} * cos(63 * π/64.0), R3 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01010001 [R3 * {square root over (ε_(s))} * cos(61 * π/64.0), R3 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01010010 [R3 * {square root over (ε_(s))} * cos(57 * π/64.0), R3 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01010011 [R3 * {square root over (ε_(s))} * cos(59 * π/64.0), R3 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01010100 [R3 * {square root over (ε_(s))} * cos(49 * π/64.0), R3 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01010101 [R3 * {square root over (ε_(s))} * cos(51 * π/64.0), R3 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01010110 [R3 * {square root over (ε_(s))} * cos(55 * π/64.0), R3 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01010111 [R3 * {square root over (ε_(s))} * cos(53 * π/64.0), R3 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01011000 [R3 * {square root over (ε_(s))} * cos(33 * π/64.0), R3 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01011001 [R3 * {square root over (ε_(s))} * cos(35 * π/64.0), R3 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01011010 [R3 * {square root over (ε_(s))} * cos(39 * π/64.0), R3 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01011011 [R3 * {square root over (ε_(s))} * cos(37 * π/64.0), R3 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01011100 [R3 * {square root over (ε_(s))} * cos(47 * π/64.0), R3 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01011101 [R3 * {square root over (ε_(s))} * cos(45 * π/64.0), R3 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01011110 [R3 * {square root over (ε_(s))} * cos(41 * π/64.0), R3 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01011111 [R3 * {square root over (ε_(s))} * cos(43 * π/64.0), R3 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01100000 [R5 * {square root over (ε_(s))} * cos(63 * π/64.0), R5 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01100001 [R5 * {square root over (ε_(s))} * cos(61 * π/64.0), R5 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01100010 [R5 * {square root over (ε_(s))} * cos(57 * π/64.0), R5 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01100011 [R5 * {square root over (ε_(s))} * cos(59 * π/64.0), R5 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01100100 [R5 * {square root over (ε_(s))} * cos(49 * π/64.0), R5 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01100101 [R5 * {square root over (ε_(s))} * cos(51 * π/64.0), R5 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01100110 [R5 * {square root over (ε_(s))} * cos(55 * π/64.0), R5 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01100111 [R5 * {square root over (ε_(s))} * cos(53 * π/64.0), R5 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01101000 [R5 * {square root over (ε_(s))} * cos(33 * π/64.0), R5 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01101001 [R5 * {square root over (ε_(s))} * cos(35 * π/64.0), R5 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01101010 [R5 * {square root over (ε_(s))} * cos(39 * π/64.0), R5 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01101011 [R5 * {square root over (ε_(s))} * cos(37 * π/64.0), R5 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01101100 [R5 * {square root over (ε_(s))} * cos(47 * π/64.0), R5 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01101101 [R5 * {square root over (ε_(s))} * cos(45 * π/64.0), R5 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01101110 [R5 * {square root over (ε_(s))} * cos(41 * π/64.0), R5 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01101111 [R5 * {square root over (ε_(s))} * cos(43 * π/64.0), R5 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01110000 [R4 * {square root over (ε_(s))} * cos(63 * π/64.0), R4 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01110001 [R4 * {square root over (ε_(s))} * cos(61 * π/64.0), R4 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01110010 [R4 * {square root over (ε_(s))} * cos(57 * π/64.0), R4 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01110011 [R4 * {square root over (ε_(s))} * cos(59 * π/64.0), R4 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01110100 [R4 * {square root over (ε_(s))} * cos(49 * π/64.0), R4 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01110101 [R4 * {square root over (ε_(s))} * cos(51 * π/64.0), R4 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01110110 [R4 * {square root over (ε_(s))} * cos(55 * π/64.0), R4 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01110111 [R4 * {square root over (ε_(s))} * cos(53 * π/64.0), R4 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01111000 [R4 * {square root over (ε_(s))} * cos(33 * π/64.0), R4 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01111001 [R4 * {square root over (ε_(s))} * cos(35 * π/64.0), R4 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01111010 [R4 * {square root over (ε_(s))} * cos(39 * π/64.0), R4 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01111011 [R4 * {square root over (ε_(s))} * cos(37 * π/64.0), R4 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01111100 [R4 * {square root over (ε_(s))} * cos(47 * π/64.0), R4 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01111101 [R4 * {square root over (ε_(s))} * cos(45 * π/64.0), R4 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01111110 [R4 * {square root over (ε_(s))} * cos(41 * π/64.0), R4 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01111111 [R4 * {square root over (ε_(s))} * cos(43 * π/64.0), R4 * {square root over (ε_(s))} * sin(43 * π/64.0)] 10000000 [R2 * {square root over (ε_(s))} * cos(63 * π/32.0), R2 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000001 [R1 * {square root over (ε_(s))} * cos(63 * π/32.0), R1 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000010 [R2 * {square root over (ε_(s))} * cos(61 * π/32.0), R2 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000011 [R1 * {square root over (ε_(s))} * cos(61 * π/32.0), R1 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000100 [R2 * {square root over (ε_(s))} * cos(57 * π/32.0), R2 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000101 [R1 * {square root over (ε_(s))} * cos(57 * π/32.0), R1 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000110 [R2 * {square root over (ε_(s))} * cos(59 * π/32.0), R2 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10000111 [R1 * {square root over (ε_(s))} * cos(59 * π/32.0), R1 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10001000 [R2 * {square root over (ε_(s))} * cos(49 * π/32.0), R2 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001001 [R1 * {square root over (ε_(s))} * cos(49 * π/32.0), R1 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001010 [R2 * {square root over (ε_(s))} * cos(51 * π/32.0), R2 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001011 [R1 * {square root over (ε_(s))} * cos(51 * π/32.0), R1 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001100 [R2 * {square root over (ε_(s))} * cos(55 * π/32.0), R2 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001101 [R1 * {square root over (ε_(s))} * cos(55 * π/32.0), R1 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001110 [R2 * {square root over (ε_(s))} * cos(53 * π/32.0), R2 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10001111 [R1 * {square root over (ε_(s))} * cos(53 * π/32.0), R1 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10010000 [R3 * {square root over (ε_(s))} * cos(127 * π/64.0), R3 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10010001 [R3 * {square root over (ε_(s))} * cos(125 * π/64.0), R3 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10010010 [R3 * {square root over (ε_(s))} * cos(121 * π/64.0), R3 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10010011 [R3 * {square root over (ε_(s))} * cos(123 * π/64.0), R3 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10010100 [R3 * {square root over (ε_(s))} * cos(113 * π/64.0), R3 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10010101 [R3 * {square root over (ε_(s))} * cos(115 * π/64.0), R3 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10010110 [R3 * {square root over (ε_(s))} * cos(119 * π/64.0), R3 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10010111 [R3 * {square root over (ε_(s))} * cos(117 * π/64.0), R3 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10011000 [R3 * {square root over (ε_(s))} * cos(97 * π/64.0), R3 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10011001 [R3 * {square root over (ε_(s))} * cos(99 * π/64.0), R3 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10011010 [R3 * {square root over (ε_(s))} * cos(103 * π/64.0), R3 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10011011 [R3 * {square root over (ε_(s))} * cos(101 * π/64.0), R3 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10011100 [R3 * {square root over (ε_(s))} * cos(111 * π/64.0), R3 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10011101 [R3 * {square root over (ε_(s))} * cos(109 * π/64.0), R3 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10011110 [R3 * {square root over (ε_(s))} * cos(105 * π/64.0), R3 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10011111 [R3 * {square root over (ε_(s))} * cos(107 * π/64.0), R3 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10100000 [R5 * {square root over (ε_(s))} * cos(127 * π/64.0), R5 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10100001 [R5 * {square root over (ε_(s))} * cos(125 * π/64.0), R5 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10100010 [R5 * {square root over (ε_(s))} * cos(121 * π/64.0), R5 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10100011 [R5 * {square root over (ε_(s))} * cos(123 * π/64.0), R5 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10100100 [R5 * {square root over (ε_(s))} * cos(113 * π/64.0), R5 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10100101 [R5 * {square root over (ε_(s))} * cos(115 * π/64.0), R5 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10100110 [R5 * {square root over (ε_(s))} * cos(119 * π/64.0), R5 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10100111 [R5 * {square root over (ε_(s))} * cos(117 * π/64.0), R5 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10101000 [R5 * {square root over (ε_(s))} * cos(97 * π/64.0), R5 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10101001 [R5 * {square root over (ε_(s))} * cos(99 * π/64.0), R5 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10101010 [R5 * {square root over (ε_(s))} * cos(103 * π/64.0), R5 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10101011 [R5 * {square root over (ε_(s))} * cos(101 * π/64.0), R5 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10101100 [R5 * {square root over (ε_(s))} * cos(111 * π/64.0), R5 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10101101 [R5 * {square root over (ε_(s))} * cos(109 * π/64.0), R5 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10101110 [R5 * {square root over (ε_(s))} * cos(105 * π/64.0), R5 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10101111 [R5 * {square root over (ε_(s))} * cos(107 * π/64.0), R5 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10110000 [R4 * {square root over (ε_(s))} * cos(127 * π/64.0), R4 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10110001 [R4 * {square root over (ε_(s))} * cos(125 * π/64.0), R4 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10110010 [R4 * {square root over (ε_(s))} * cos(121 * π/64.0), R4 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10110011 [R4 * {square root over (ε_(s))} * cos(123 * π/64.0), R4 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10110100 [R4 * {square root over (ε_(s))} * cos(113 * π/64.0), R4 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10110101 [R4 * {square root over (ε_(s))} * cos(115 * π/64.0), R4 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10110110 [R4 * {square root over (ε_(s))} * cos(119 * π/64.0), R4 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10110111 [R4 * {square root over (ε_(s))} * cos(117 * π/64.0), R4 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10111000 [R4 * {square root over (ε_(s))} * cos(97 * π/64.0), R4 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10111001 [R4 * {square root over (ε_(s))} * cos(99 * π/64.0), R4 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10111010 [R4 * {square root over (ε_(s))} * cos(103 * π/64.0), R4 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10111011 [R4 * {square root over (ε_(s))} * cos(101 * π/64.0), R4 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10111100 [R4 * {square root over (ε_(s))} * cos(111 * π/64.0), R4 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10111101 [R4 * {square root over (ε_(s))} * cos(109 * π/64.0), R4 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10111110 [R4 * {square root over (ε_(s))} * cos(105 * π/64.0), R4 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10111111 [R4 * {square root over (ε_(s))} * cos(107 * π/64.0), R4 * {square root over (ε_(s))} * sin(107 * π/64.0)] 11000000 [R2 * {square root over (ε_(s))} * cos(33 * π/32.0), R2 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000001 [R1 * {square root over (ε_(s))} * cos(33 * π/32.0), R1 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000010 [R2 * {square root over (ε_(s))} * cos(35 * π/32.0), R2 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000011 [R1 * {square root over (ε_(s))} * cos(35 * π/32.0), R1 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000100 [R2 * {square root over (ε_(s))} * cos(39 * π/32.0), R2 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000101 [R1 * {square root over (ε_(s))} * cos(39 * π/32.0), R1 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000110 [R2 * {square root over (ε_(s))} * cos(37 * π/32.0), R2 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11000111 [R1 * {square root over (ε_(s))} * cos(37 * π/32.0), R1 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11001000 [R2 * {square root over (ε_(s))} * cos(47 * π/32.0), R2 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001001 [R1 * {square root over (ε_(s))} * cos(47 * π/32.0), R1 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001010 [R2 * {square root over (ε_(s))} * cos(45 * π/32.0), R2 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001011 [R1 * {square root over (ε_(s))} * cos(45 * π/32.0), R1 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001100 [R2 * {square root over (ε_(s))} * cos(41 * π/32.0), R2 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001101 [R1 * {square root over (ε_(s))} * cos(41 * π/32.0), R1 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001110 [R2 * {square root over (ε_(s))} * cos(43 * π/32.0), R2 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11001111 [R1 * {square root over (ε_(s))} * cos(43 * π/32.0), R1 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11010000 [R3 * {square root over (ε_(s))} * cos(65 * π/64.0), R3 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11010001 [R3 * {square root over (ε_(s))} * cos(67 * π/64.0), R3 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11010010 [R3 * {square root over (ε_(s))} * cos(71 * π/64.0), R3 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11010011 [R3 * {square root over (ε_(s))} * cos(69 * π/64.0), R3 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11010100 [R3 * {square root over (ε_(s))} * cos(79 * π/64.0), R3 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11010101 [R3 * {square root over (ε_(s))} * cos(77 * π/64.0), R3 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11010110 [R3 * {square root over (ε_(s))} * cos(73 * π/64.0), R3 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11010111 [R3 * {square root over (ε_(s))} * cos(75 * π/64.0), R3 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11011000 [R3 * {square root over (ε_(s))} * cos(95 * π/64.0), R3 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11011001 [R3 * {square root over (ε_(s))} * cos(93 * π/64.0), R3 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11011010 [R3 * {square root over (ε_(s))} * cos(89 * π/64.0), R3 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11011011 [R3 * {square root over (ε_(s))} * cos(91 * π/64.0), R3 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11011100 [R3 * {square root over (ε_(s))} * cos(81 * π/64.0), R3 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11011101 [R3 * {square root over (ε_(s))} * cos(83 * π/64.0), R3 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11011110 [R3 * {square root over (ε_(s))} * cos(87 * π/64.0), R3 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11011111 [R3 * {square root over (ε_(s))} * cos(85 * π/64.0), R3 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11100000 [R5 * {square root over (ε_(s))} * cos(65 * π/64.0), R5 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11100001 [R5 * {square root over (ε_(s))} * cos(67 * π/64.0), R5 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11100010 [R5 * {square root over (ε_(s))} * cos(71 * π/64.0), R5 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11100011 [R5 * {square root over (ε_(s))} * cos(69 * π/64.0), R5 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11100100 [R5 * {square root over (ε_(s))} * cos(79 * π/64.0), R5 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11100101 [R5 * {square root over (ε_(s))} * cos(77 * π/64.0), R5 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11100110 [R5 * {square root over (ε_(s))} * cos(73 * π/64.0), R5 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11100111 [R5 * {square root over (ε_(s))} * cos(75 * π/64.0), R5 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11101000 [R5 * {square root over (ε_(s))} * cos(95 * π/64.0), R5 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11101001 [R5 * {square root over (ε_(s))} * cos(93 * π/64.0), R5 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11101010 [R5 * {square root over (ε_(s))} * cos(89 * π/64.0), R5 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11101011 [R5 * {square root over (ε_(s))} * cos(91 * π/64.0), R5 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11101100 [R5 * {square root over (ε_(s))} * cos(81 * π/64.0), R5 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11101101 [R5 * {square root over (ε_(s))} * cos(83 * π/64.0), R5 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11101110 [R5 * {square root over (ε_(s))} * cos(87 * π/64.0), R5 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11101111 [R5 * {square root over (ε_(s))} * cos(85 * π/64.0), R5 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11110000 [R4 * {square root over (ε_(s))} * cos(65 * π/64.0), R4 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11110001 [R4 * {square root over (ε_(s))} * cos(67 * π/64.0), R4 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11110010 [R4 * {square root over (ε_(s))} * cos(71 * π/64.0), R4 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11110011 [R4 * {square root over (ε_(s))} * cos(69 * π/64.0), R4 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11110100 [R4 * {square root over (ε_(s))} * cos(79 * π/64.0), R4 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11110101 [R4 * {square root over (ε_(s))} * cos(77 * π/64.0), R4 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11110110 [R4 * {square root over (ε_(s))} * cos(73 * π/64.0), R4 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11110111 [R4 * {square root over (ε_(s))} * cos(75 * π/64.0), R4 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11111000 [R4 * {square root over (ε_(s))} * cos(95 * π/64.0), R4 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11111001 [R4 * {square root over (ε_(s))} * cos(93 * π/64.0), R4 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11111010 [R4 * {square root over (ε_(s))} * cos(89 * π/64.0), R4 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11111011 [R4 * {square root over (ε_(s))} * cos(91 * π/64.0), R4 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11111100 [R4 * {square root over (ε_(s))} * cos(81 * π/64.0), R4 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11111101 [R4 * {square root over (ε_(s))} * cos(83 * π/64.0), R4 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11111110 [R4 * {square root over (ε_(s))} * cos(87 * π/64.0), R4 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11111111 [R4 * {square root over (ε_(s))} * cos(85 * π/64.0), R4 * {square root over (ε_(s))} * sin(85 * π/64.0)].


21. An apparatus, comprising: at least one processor; and at least one memory including computer program code for one or more programs, the at least one memory and the computer program code configured to, with the at least one processor, cause the apparatus to perform at least the following: modulating a signal, via a modulation device, in accordance with a 256-APSK modulation based on a signal constellation of a 32+32+64+64+64 ring format, having bit labeling and [x, y] bit coordinate positions as follows (where ε_(s) represents average energy per symbol, 32*R1²+32*R2²+64*R3²+64*R4²+64*R5²=256, and R1 represents the radius of the inner-most ring, R2 represents the radius of the next outer ring, R3 represents the radius of the next outer ring, R4 represents the radius of the next outer ring, and R5 represents the radius of the outer-most ring): Bit Label [x, y] Coordinates 00000000 [R2 * {square root over (ε_(s))} * cos(π/32.0), R2 * {square root over (ε_(s))} * sin(π/32.0)] 00000001 [R1 * {square root over (ε_(s))} * cos(π/32.0), R1 * {square root over (ε_(s))} * sin(π/32.0)] 00000010 [R2 * {square root over (ε_(s))} * cos(3 * π/32.0), R2 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000011 [R1 * {square root over (ε_(s))} * cos(3 * π/32.0), R1 * {square root over (ε_(s))} * sin(3 * π/32.0)] 00000100 [R2 * {square root over (ε_(s))} * cos(7 * π/32.0), R2 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000101 [R1 * {square root over (ε_(s))} * cos(7 * π/32.0), R1 * {square root over (ε_(s))} * sin(7 * π/32.0)] 00000110 [R2 * {square root over (ε_(s))} * cos(5 * π/32.0), R2 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00000111 [R1 * {square root over (ε_(s))} * cos(5 * π/32.0), R1 * {square root over (ε_(s))} * sin(5 * π/32.0)] 00001000 [R2 * {square root over (ε_(s))} * cos(15 * π/32.0), R2 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001001 [R1 * {square root over (ε_(s))} * cos(15 * π/32.0), R1 * {square root over (ε_(s))} * sin(15 * π/32.0)] 00001010 [R2 * {square root over (ε_(s))} * cos(13 * π/32.0), R2 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001011 [R1 * {square root over (ε_(s))} * cos(13 * π/32.0), R1 * {square root over (ε_(s))} * sin(13 * π/32.0)] 00001100 [R2 * {square root over (ε_(s))} * cos(9 * π/32.0), R2 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001101 [R1 * {square root over (ε_(s))} * cos(9 * π/32.0), R1 * {square root over (ε_(s))} * sin(9 * π/32.0)] 00001110 [R2 * {square root over (ε_(s))} * cos(11 * π/32.0), R2 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00001111 [R1 * {square root over (ε_(s))} * cos(11 * π/32.0), R1 * {square root over (ε_(s))} * sin(11 * π/32.0)] 00010000 [R3 * {square root over (ε_(s))} * cos(π/64.0), R3 * {square root over (ε_(s))} * sin(π/64.0)] 00010001 [R3 * {square root over (ε_(s))} * cos(3 * π/64.0), R3 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00010010 [R3 * {square root over (ε_(s))} * cos(7 * π/64.0), R3 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00010011 [R3 * {square root over (ε_(s))} * cos(5 * π/64.0), R3 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00010100 [R3 * {square root over (ε_(s))} * cos(15 * π/64.0), R3 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00010101 [R3 * {square root over (ε_(s))} * cos(13 * π/64.0), R3 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00010110 [R3 * {square root over (ε_(s))} * cos(9 * π/64.0), R3 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00010111 [R3 * {square root over (ε_(s))} * cos(11 * π/64.0), R3 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00011000 [R3 * {square root over (ε_(s))} * cos(31 * π/64.0), R3 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00011001 [R3 * {square root over (ε_(s))} * cos(29 * π/64.0), R3 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00011010 [R3 * {square root over (ε_(s))} * cos(25 * π/64.0), R3 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00011011 [R3 * {square root over (ε_(s))} * cos(27 * π/64.0), R3 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00011100 [R3 * {square root over (ε_(s))} * cos(17 * π/64.0), R3 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00011101 [R3 * {square root over (ε_(s))} * cos(19 * π/64.0), R3 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00011110 [R3 * {square root over (ε_(s))} * cos(23 * π/64.0), R3 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00011111 [R3 * {square root over (ε_(s))} * cos(21 * π/64.0), R3 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00100000 [R5 * {square root over (ε_(s))} * cos(π/64.0), R5 * {square root over (ε_(s))} * sin(π/64.0)] 00100001 [R5 * {square root over (ε_(s))} * cos(3 * π/64.0), R5 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00100010 [R5 * {square root over (ε_(s))} * cos(7 * π/64.0), R5 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00100011 [R5 * {square root over (ε_(s))} * cos(5 * π/64.0), R5 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00100100 [R5 * {square root over (ε_(s))} * cos(15 * π/64.0), R5 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00100101 [R5 * {square root over (ε_(s))} * cos(13 * π/64.0), R5 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00100110 [R5 * {square root over (ε_(s))} * cos(9 * π/64.0), R5 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00100111 [R5 * {square root over (ε_(s))} * cos(11 * π/64.0), R5 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00101000 [R5 * {square root over (ε_(s))} * cos(31 * π/64.0), R5 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00101001 [R5 * {square root over (ε_(s))} * cos(29 * π/64.0), R5 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00101010 [R5 * {square root over (ε_(s))} * cos(25 * π/64.0), R5 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00101011 [R5 * {square root over (ε_(s))} * cos(27 * π/64.0), R5 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00101100 [R5 * {square root over (ε_(s))} * cos(17 * π/64.0), R5 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00101101 [R5 * {square root over (ε_(s))} * cos(19 * π/64.0), R5 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00101110 [R5 * {square root over (ε_(s))} * cos(23 * π/64.0), R5 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00101111 [R5 * {square root over (ε_(s))} * cos(21 * π/64.0), R5 * {square root over (ε_(s))} * sin(21 * π/64.0)] 00110000 [R4 * {square root over (ε_(s))} * cos(π/64.0), R4 * {square root over (ε_(s))} * sin(π/64.0)] 00110001 [R4 * {square root over (ε_(s))} * cos(3 * π/64.0), R4 * {square root over (ε_(s))} * sin(3 * π/64.0)] 00110010 [R4 * {square root over (ε_(s))} * cos(7 * π/64.0), R4 * {square root over (ε_(s))} * sin(7 * π/64.0)] 00110011 [R4 * {square root over (ε_(s))} * cos(5 * π/64.0), R4 * {square root over (ε_(s))} * sin(5 * π/64.0)] 00110100 [R4 * {square root over (ε_(s))} * cos(15 * π/64.0), R4 * {square root over (ε_(s))} * sin(15 * π/64.0)] 00110101 [R4 * {square root over (ε_(s))} * cos(13 * π/64.0), R4 * {square root over (ε_(s))} * sin(13 * π/64.0)] 00110110 [R4 * {square root over (ε_(s))} * cos(9 * π/64.0), R4 * {square root over (ε_(s))} * sin(9 * π/64.0)] 00110111 [R4 * {square root over (ε_(s))} * cos(11 * π/64.0), R4 * {square root over (ε_(s))} * sin(11 * π/64.0)] 00111000 [R4 * {square root over (ε_(s))} * cos(31 * π/64.0), R4 * {square root over (ε_(s))} * sin(31 * π/64.0)] 00111001 [R4 * {square root over (ε_(s))} * cos(29 * π/64.0), R4 * {square root over (ε_(s))} * sin(29 * π/64.0)] 00111010 [R4 * {square root over (ε_(s))} * cos(25 * π/64.0), R4 * {square root over (ε_(s))} * sin(25 * π/64.0)] 00111011 [R4 * {square root over (ε_(s))} * cos(27 * π/64.0), R4 * {square root over (ε_(s))} * sin(27 * π/64.0)] 00111100 [R4 * {square root over (ε_(s))} * cos(17 * π/64.0), R4 * {square root over (ε_(s))} * sin(17 * π/64.0)] 00111101 [R4 * {square root over (ε_(s))} * cos(19 * π/64.0), R4 * {square root over (ε_(s))} * sin(19 * π/64.0)] 00111110 [R4 * {square root over (ε_(s))} * cos(23 * π/64.0), R4 * {square root over (ε_(s))} * sin(23 * π/64.0)] 00111111 [R4 * {square root over (ε_(s))} * cos(21 * π/64.0), R4 * {square root over (ε_(s))} * sin(21 * π/64.0)] 01000000 [R2 * {square root over (ε_(s))} * cos(31 * π/32.0), R2 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000001 [R1 * {square root over (ε_(s))} * cos(31 * π/32.0), R1 * {square root over (ε_(s))} * sin(31 * π/32.0)] 01000010 [R2 * {square root over (ε_(s))} * cos(29 * π/32.0), R2 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000011 [R1 * {square root over (ε_(s))} * cos(29 * π/32.0), R1 * {square root over (ε_(s))} * sin(29 * π/32.0)] 01000100 [R2 * {square root over (ε_(s))} * cos(25 * π/32.0), R2 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000101 [R1 * {square root over (ε_(s))} * cos(25 * π/32.0), R1 * {square root over (ε_(s))} * sin(25 * π/32.0)] 01000110 [R2 * {square root over (ε_(s))} * cos(27 * π/32.0), R2 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01000111 [R1 * {square root over (ε_(s))} * cos(27 * π/32.0), R1 * {square root over (ε_(s))} * sin(27 * π/32.0)] 01001000 [R2 * {square root over (ε_(s))} * cos(17 * π/32.0), R2 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001001 [R1 * {square root over (ε_(s))} * cos(17 * π/32.0), R1 * {square root over (ε_(s))} * sin(17 * π/32.0)] 01001010 [R2 * {square root over (ε_(s))} * cos(19 * π/32.0), R2 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001011 [R1 * {square root over (ε_(s))} * cos(19 * π/32.0), R1 * {square root over (ε_(s))} * sin(19 * π/32.0)] 01001100 [R2 * {square root over (ε_(s))} * cos(23 * π/32.0), R2 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001101 [R1 * {square root over (ε_(s))} * cos(23 * π/32.0), R1 * {square root over (ε_(s))} * sin(23 * π/32.0)] 01001110 [R2 * {square root over (ε_(s))} * cos(21 * π/32.0), R2 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01001111 [R1 * {square root over (ε_(s))} * cos(21 * π/32.0), R1 * {square root over (ε_(s))} * sin(21 * π/32.0)] 01010000 [R3 * {square root over (ε_(s))} * cos(63 * π/64.0), R3 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01010001 [R3 * {square root over (ε_(s))} * cos(61 * π/64.0), R3 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01010010 [R3 * {square root over (ε_(s))} * cos(57 * π/64.0), R3 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01010011 [R3 * {square root over (ε_(s))} * cos(59 * π/64.0), R3 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01010100 [R3 * {square root over (ε_(s))} * cos(49 * π/64.0), R3 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01010101 [R3 * {square root over (ε_(s))} * cos(51 * π/64.0), R3 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01010110 [R3 * {square root over (ε_(s))} * cos(55 * π/64.0), R3 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01010111 [R3 * {square root over (ε_(s))} * cos(53 * π/64.0), R3 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01011000 [R3 * {square root over (ε_(s))} * cos(33 * π/64.0), R3 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01011001 [R3 * {square root over (ε_(s))} * cos(35 * π/64.0), R3 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01011010 [R3 * {square root over (ε_(s))} * cos(39 * π/64.0), R3 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01011011 [R3 * {square root over (ε_(s))} * cos(37 * π/64.0), R3 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01011100 [R3 * {square root over (ε_(s))} * cos(47 * π/64.0), R3 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01011101 [R3 * {square root over (ε_(s))} * cos(45 * π/64.0), R3 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01011110 [R3 * {square root over (ε_(s))} * cos(41 * π/64.0), R3 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01011111 [R3 * {square root over (ε_(s))} * cos(43 * π/64.0), R3 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01100000 [R5 * {square root over (ε_(s))} * cos(63 * π/64.0), R5 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01100001 [R5 * {square root over (ε_(s))} * cos(61 * π/64.0), R5 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01100010 [R5 * {square root over (ε_(s))} * cos(57 * π/64.0), R5 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01100011 [R5 * {square root over (ε_(s))} * cos(59 * π/64.0), R5 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01100100 [R5 * {square root over (ε_(s))} * cos(49 * π/64.0), R5 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01100101 [R5 * {square root over (ε_(s))} * cos(51 * π/64.0), R5 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01100110 [R5 * {square root over (ε_(s))} * cos(55 * π/64.0), R5 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01100111 [R5 * {square root over (ε_(s))} * cos(53 * π/64.0), R5 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01101000 [R5 * {square root over (ε_(s))} * cos(33 * π/64.0), R5 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01101001 [R5 * {square root over (ε_(s))} * cos(35 * π/64.0), R5 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01101010 [R5 * {square root over (ε_(s))} * cos(39 * π/64.0), R5 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01101011 [R5 * {square root over (ε_(s))} * cos(37 * π/64.0), R5 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01101100 [R5 * {square root over (ε_(s))} * cos(47 * π/64.0), R5 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01101101 [R5 * {square root over (ε_(s))} * cos(45 * π/64.0), R5 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01101110 [R5 * {square root over (ε_(s))} * cos(41 * π/64.0), R5 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01101111 [R5 * {square root over (ε_(s))} * cos(43 * π/64.0), R5 * {square root over (ε_(s))} * sin(43 * π/64.0)] 01110000 [R4 * {square root over (ε_(s))} * cos(63 * π/64.0), R4 * {square root over (ε_(s))} * sin(63 * π/64.0)] 01110001 [R4 * {square root over (ε_(s))} * cos(61 * π/64.0), R4 * {square root over (ε_(s))} * sin(61 * π/64.0)] 01110010 [R4 * {square root over (ε_(s))} * cos(57 * π/64.0), R4 * {square root over (ε_(s))} * sin(57 * π/64.0)] 01110011 [R4 * {square root over (ε_(s))} * cos(59 * π/64.0), R4 * {square root over (ε_(s))} * sin(59 * π/64.0)] 01110100 [R4 * {square root over (ε_(s))} * cos(49 * π/64.0), R4 * {square root over (ε_(s))} * sin(49 * π/64.0)] 01110101 [R4 * {square root over (ε_(s))} * cos(51 * π/64.0), R4 * {square root over (ε_(s))} * sin(51 * π/64.0)] 01110110 [R4 * {square root over (ε_(s))} * cos(55 * π/64.0), R4 * {square root over (ε_(s))} * sin(55 * π/64.0)] 01110111 [R4 * {square root over (ε_(s))} * cos(53 * π/64.0), R4 * {square root over (ε_(s))} * sin(53 * π/64.0)] 01111000 [R4 * {square root over (ε_(s))} * cos(33 * π/64.0), R4 * {square root over (ε_(s))} * sin(33 * π/64.0)] 01111001 [R4 * {square root over (ε_(s))} * cos(35 * π/64.0), R4 * {square root over (ε_(s))} * sin(35 * π/64.0)] 01111010 [R4 * {square root over (ε_(s))} * cos(39 * π/64.0), R4 * {square root over (ε_(s))} * sin(39 * π/64.0)] 01111011 [R4 * {square root over (ε_(s))} * cos(37 * π/64.0), R4 * {square root over (ε_(s))} * sin(37 * π/64.0)] 01111100 [R4 * {square root over (ε_(s))} * cos(47 * π/64.0), R4 * {square root over (ε_(s))} * sin(47 * π/64.0)] 01111101 [R4 * {square root over (ε_(s))} * cos(45 * π/64.0), R4 * {square root over (ε_(s))} * sin(45 * π/64.0)] 01111110 [R4 * {square root over (ε_(s))} * cos(41 * π/64.0), R4 * {square root over (ε_(s))} * sin(41 * π/64.0)] 01111111 [R4 * {square root over (ε_(s))} * cos(43 * π/64.0), R4 * {square root over (ε_(s))} * sin(43 * π/64.0)] 10000000 [R2 * {square root over (ε_(s))} * cos(63 * π/32.0), R2 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000001 [R1 * {square root over (ε_(s))} * cos(63 * π/32.0), R1 * {square root over (ε_(s))} * sin(63 * π/32.0)] 10000010 [R2 * {square root over (ε_(s))} * cos(61 * π/32.0), R2 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000011 [R1 * {square root over (ε_(s))} * cos(61 * π/32.0), R1 * {square root over (ε_(s))} * sin(61 * π/32.0)] 10000100 [R2 * {square root over (ε_(s))} * cos(57 * π/32.0), R2 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000101 [R1 * {square root over (ε_(s))} * cos(57 * π/32.0), R1 * {square root over (ε_(s))} * sin(57 * π/32.0)] 10000110 [R2 * {square root over (ε_(s))} * cos(59 * π/32.0), R2 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10000111 [R1 * {square root over (ε_(s))} * cos(59 * π/32.0), R1 * {square root over (ε_(s))} * sin(59 * π/32.0)] 10001000 [R2 * {square root over (ε_(s))} * cos(49 * π/32.0), R2 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001001 [R1 * {square root over (ε_(s))} * cos(49 * π/32.0), R1 * {square root over (ε_(s))} * sin(49 * π/32.0)] 10001010 [R2 * {square root over (ε_(s))} * cos(51 * π/32.0), R2 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001011 [R1 * {square root over (ε_(s))} * cos(51 * π/32.0), R1 * {square root over (ε_(s))} * sin(51 * π/32.0)] 10001100 [R2 * {square root over (ε_(s))} * cos(55 * π/32.0), R2 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001101 [R1 * {square root over (ε_(s))} * cos(55 * π/32.0), R1 * {square root over (ε_(s))} * sin(55 * π/32.0)] 10001110 [R2 * {square root over (ε_(s))} * cos(53 * π/32.0), R2 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10001111 [R1 * {square root over (ε_(s))} * cos(53 * π/32.0), R1 * {square root over (ε_(s))} * sin(53 * π/32.0)] 10010000 [R3 * {square root over (ε_(s))} * cos(127 * π/64.0), R3 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10010001 [R3 * {square root over (ε_(s))} * cos(125 * π/64.0), R3 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10010010 [R3 * {square root over (ε_(s))} * cos(121 * π/64.0), R3 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10010011 [R3 * {square root over (ε_(s))} * cos(123 * π/64.0), R3 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10010100 [R3 * {square root over (ε_(s))} * cos(113 * π/64.0), R3 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10010101 [R3 * {square root over (ε_(s))} * cos(115 * π/64.0), R3 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10010110 [R3 * {square root over (ε_(s))} * cos(119 * π/64.0), R3 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10010111 [R3 * {square root over (ε_(s))} * cos(117 * π/64.0), R3 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10011000 [R3 * {square root over (ε_(s))} * cos(97 * π/64.0), R3 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10011001 [R3 * {square root over (ε_(s))} * cos(99 * π/64.0), R3 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10011010 [R3 * {square root over (ε_(s))} * cos(103 * π/64.0), R3 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10011011 [R3 * {square root over (ε_(s))} * cos(101 * π/64.0), R3 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10011100 [R3 * {square root over (ε_(s))} * cos(111 * π/64.0), R3 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10011101 [R3 * {square root over (ε_(s))} * cos(109 * π/64.0), R3 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10011110 [R3 * {square root over (ε_(s))} * cos(105 * π/64.0), R3 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10011111 [R3 * {square root over (ε_(s))} * cos(107 * π/64.0), R3 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10100000 [R5 * {square root over (ε_(s))} * cos(127 * π/64.0), R5 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10100001 [R5 * {square root over (ε_(s))} * cos(125 * π/64.0), R5 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10100010 [R5 * {square root over (ε_(s))} * cos(121 * π/64.0), R5 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10100011 [R5 * {square root over (ε_(s))} * cos(123 * π/64.0), R5 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10100100 [R5 * {square root over (ε_(s))} * cos(113 * π/64.0), R5 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10100101 [R5 * {square root over (ε_(s))} * cos(115 * π/64.0), R5 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10100110 [R5 * {square root over (ε_(s))} * cos(119 * π/64.0), R5 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10100111 [R5 * {square root over (ε_(s))} * cos(117 * π/64.0), R5 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10101000 [R5 * {square root over (ε_(s))} * cos(97 * π/64.0), R5 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10101001 [R5 * {square root over (ε_(s))} * cos(99 * π/64.0), R5 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10101010 [R5 * {square root over (ε_(s))} * cos(103 * π/64.0), R5 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10101011 [R5 * {square root over (ε_(s))} * cos(101 * π/64.0), R5 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10101100 [R5 * {square root over (ε_(s))} * cos(111 * π/64.0), R5 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10101101 [R5 * {square root over (ε_(s))} * cos(109 * π/64.0), R5 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10101110 [R5 * {square root over (ε_(s))} * cos(105 * π/64.0), R5 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10101111 [R5 * {square root over (ε_(s))} * cos(107 * π/64.0), R5 * {square root over (ε_(s))} * sin(107 * π/64.0)] 10110000 [R4 * {square root over (ε_(s))} * cos(127 * π/64.0), R4 * {square root over (ε_(s))} * sin(127 * π/64.0)] 10110001 [R4 * {square root over (ε_(s))} * cos(125 * π/64.0), R4 * {square root over (ε_(s))} * sin(125 * π/64.0)] 10110010 [R4 * {square root over (ε_(s))} * cos(121 * π/64.0), R4 * {square root over (ε_(s))} * sin(121 * π/64.0)] 10110011 [R4 * {square root over (ε_(s))} * cos(123 * π/64.0), R4 * {square root over (ε_(s))} * sin(123 * π/64.0)] 10110100 [R4 * {square root over (ε_(s))} * cos(113 * π/64.0), R4 * {square root over (ε_(s))} * sin(113 * π/64.0)] 10110101 [R4 * {square root over (ε_(s))} * cos(115 * π/64.0), R4 * {square root over (ε_(s))} * sin(115 * π/64.0)] 10110110 [R4 * {square root over (ε_(s))} * cos(119 * π/64.0), R4 * {square root over (ε_(s))} * sin(119 * π/64.0)] 10110111 [R4 * {square root over (ε_(s))} * cos(117 * π/64.0), R4 * {square root over (ε_(s))} * sin(117 * π/64.0)] 10111000 [R4 * {square root over (ε_(s))} * cos(97 * π/64.0), R4 * {square root over (ε_(s))} * sin(97 * π/64.0)] 10111001 [R4 * {square root over (ε_(s))} * cos(99 * π/64.0), R4 * {square root over (ε_(s))} * sin(99 * π/64.0)] 10111010 [R4 * {square root over (ε_(s))} * cos(103 * π/64.0), R4 * {square root over (ε_(s))} * sin(103 * π/64.0)] 10111011 [R4 * {square root over (ε_(s))} * cos(101 * π/64.0), R4 * {square root over (ε_(s))} * sin(101 * π/64.0)] 10111100 [R4 * {square root over (ε_(s))} * cos(111 * π/64.0), R4 * {square root over (ε_(s))} * sin(111 * π/64.0)] 10111101 [R4 * {square root over (ε_(s))} * cos(109 * π/64.0), R4 * {square root over (ε_(s))} * sin(109 * π/64.0)] 10111110 [R4 * {square root over (ε_(s))} * cos(105 * π/64.0), R4 * {square root over (ε_(s))} * sin(105 * π/64.0)] 10111111 [R4 * {square root over (ε_(s))} * cos(107 * π/64.0), R4 * {square root over (ε_(s))} * sin(107 * π/64.0)] 11000000 [R2 * {square root over (ε_(s))} * cos(33 * π/32.0), R2 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000001 [R1 * {square root over (ε_(s))} * cos(33 * π/32.0), R1 * {square root over (ε_(s))} * sin(33 * π/32.0)] 11000010 [R2 * {square root over (ε_(s))} * cos(35 * π/32.0), R2 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000011 [R1 * {square root over (ε_(s))} * cos(35 * π/32.0), R1 * {square root over (ε_(s))} * sin(35 * π/32.0)] 11000100 [R2 * {square root over (ε_(s))} * cos(39 * π/32.0), R2 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000101 [R1 * {square root over (ε_(s))} * cos(39 * π/32.0), R1 * {square root over (ε_(s))} * sin(39 * π/32.0)] 11000110 [R2 * {square root over (ε_(s))} * cos(37 * π/32.0), R2 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11000111 [R1 * {square root over (ε_(s))} * cos(37 * π/32.0), R1 * {square root over (ε_(s))} * sin(37 * π/32.0)] 11001000 [R2 * {square root over (ε_(s))} * cos(47 * π/32.0), R2 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001001 [R1 * {square root over (ε_(s))} * cos(47 * π/32.0), R1 * {square root over (ε_(s))} * sin(47 * π/32.0)] 11001010 [R2 * {square root over (ε_(s))} * cos(45 * π/32.0), R2 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001011 [R1 * {square root over (ε_(s))} * cos(45 * π/32.0), R1 * {square root over (ε_(s))} * sin(45 * π/32.0)] 11001100 [R2 * {square root over (ε_(s))} * cos(41 * π/32.0), R2 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001101 [R1 * {square root over (ε_(s))} * cos(41 * π/32.0), R1 * {square root over (ε_(s))} * sin(41 * π/32.0)] 11001110 [R2 * {square root over (ε_(s))} * cos(43 * π/32.0), R2 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11001111 [R1 * {square root over (ε_(s))} * cos(43 * π/32.0), R1 * {square root over (ε_(s))} * sin(43 * π/32.0)] 11010000 [R3 * {square root over (ε_(s))} * cos(65 * π/64.0), R3 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11010001 [R3 * {square root over (ε_(s))} * cos(67 * π/64.0), R3 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11010010 [R3 * {square root over (ε_(s))} * cos(71 * π/64.0), R3 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11010011 [R3 * {square root over (ε_(s))} * cos(69 * π/64.0), R3 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11010100 [R3 * {square root over (ε_(s))} * cos(79 * π/64.0), R3 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11010101 [R3 * {square root over (ε_(s))} * cos(77 * π/64.0), R3 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11010110 [R3 * {square root over (ε_(s))} * cos(73 * π/64.0), R3 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11010111 [R3 * {square root over (ε_(s))} * cos(75 * π/64.0), R3 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11011000 [R3 * {square root over (ε_(s))} * cos(95 * π/64.0), R3 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11011001 [R3 * {square root over (ε_(s))} * cos(93 * π/64.0), R3 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11011010 [R3 * {square root over (ε_(s))} * cos(89 * π/64.0), R3 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11011011 [R3 * {square root over (ε_(s))} * cos(91 * π/64.0), R3 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11011100 [R3 * {square root over (ε_(s))} * cos(81 * π/64.0), R3 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11011101 [R3 * {square root over (ε_(s))} * cos(83 * π/64.0), R3 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11011110 [R3 * {square root over (ε_(s))} * cos(87 * π/64.0), R3 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11011111 [R3 * {square root over (ε_(s))} * cos(85 * π/64.0), R3 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11100000 [R5 * {square root over (ε_(s))} * cos(65 * π/64.0), R5 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11100001 [R5 * {square root over (ε_(s))} * cos(67 * π/64.0), R5 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11100010 [R5 * {square root over (ε_(s))} * cos(71 * π/64.0), R5 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11100011 [R5 * {square root over (ε_(s))} * cos(69 * π/64.0), R5 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11100100 [R5 * {square root over (ε_(s))} * cos(79 * π/64.0), R5 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11100101 [R5 * {square root over (ε_(s))} * cos(77 * π/64.0), R5 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11100110 [R5 * {square root over (ε_(s))} * cos(73 * π/64.0), R5 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11100111 [R5 * {square root over (ε_(s))} * cos(75 * π/64.0), R5 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11101000 [R5 * {square root over (ε_(s))} * cos(95 * π/64.0), R5 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11101001 [R5 * {square root over (ε_(s))} * cos(93 * π/64.0), R5 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11101010 [R5 * {square root over (ε_(s))} * cos(89 * π/64.0), R5 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11101011 [R5 * {square root over (ε_(s))} * cos(91 * π/64.0), R5 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11101100 [R5 * {square root over (ε_(s))} * cos(81 * π/64.0), R5 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11101101 [R5 * {square root over (ε_(s))} * cos(83 * π/64.0), R5 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11101110 [R5 * {square root over (ε_(s))} * cos(87 * π/64.0), R5 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11101111 [R5 * {square root over (ε_(s))} * cos(85 * π/64.0), R5 * {square root over (ε_(s))} * sin(85 * π/64.0)] 11110000 [R4 * {square root over (ε_(s))} * cos(65 * π/64.0), R4 * {square root over (ε_(s))} * sin(65 * π/64.0)] 11110001 [R4 * {square root over (ε_(s))} * cos(67 * π/64.0), R4 * {square root over (ε_(s))} * sin(67 * π/64.0)] 11110010 [R4 * {square root over (ε_(s))} * cos(71 * π/64.0), R4 * {square root over (ε_(s))} * sin(71 * π/64.0)] 11110011 [R4 * {square root over (ε_(s))} * cos(69 * π/64.0), R4 * {square root over (ε_(s))} * sin(69 * π/64.0)] 11110100 [R4 * {square root over (ε_(s))} * cos(79 * π/64.0), R4 * {square root over (ε_(s))} * sin(79 * π/64.0)] 11110101 [R4 * {square root over (ε_(s))} * cos(77 * π/64.0), R4 * {square root over (ε_(s))} * sin(77 * π/64.0)] 11110110 [R4 * {square root over (ε_(s))} * cos(73 * π/64.0), R4 * {square root over (ε_(s))} * sin(73 * π/64.0)] 11110111 [R4 * {square root over (ε_(s))} * cos(75 * π/64.0), R4 * {square root over (ε_(s))} * sin(75 * π/64.0)] 11111000 [R4 * {square root over (ε_(s))} * cos(95 * π/64.0), R4 * {square root over (ε_(s))} * sin(95 * π/64.0)] 11111001 [R4 * {square root over (ε_(s))} * cos(93 * π/64.0), R4 * {square root over (ε_(s))} * sin(93 * π/64.0)] 11111010 [R4 * {square root over (ε_(s))} * cos(89 * π/64.0), R4 * {square root over (ε_(s))} * sin(89 * π/64.0)] 11111011 [R4 * {square root over (ε_(s))} * cos(91 * π/64.0), R4 * {square root over (ε_(s))} * sin(91 * π/64.0)] 11111100 [R4 * {square root over (ε_(s))} * cos(81 * π/64.0), R4 * {square root over (ε_(s))} * sin(81 * π/64.0)] 11111101 [R4 * {square root over (ε_(s))} * cos(83 * π/64.0), R4 * {square root over (ε_(s))} * sin(83 * π/64.0)] 11111110 [R4 * {square root over (ε_(s))} * cos(87 * π/64.0), R4 * {square root over (ε_(s))} * sin(87 * π/64.0)] 11111111 [R4 * {square root over (ε_(s))} * cos(85 * π/64.0), R4 * {square root over (ε_(s))} * sin(85 * π/64.0)].


22. The apparatus of claim 21, wherein each of the [x, y] bit coordinate positions is rotated by a same rotation factor (from 1 to 359°, inclusive), and/or each bit label is altered by interchanging the 0's and 1's, and/or a uniform swapping of bit positions is applied within each bit label. 